Computational Model of Electrically Coupled, Intrinsically Distinct Pacemaker Neurons

doi:10.1152/jn.00013.2005

HOME

HELP

FEEDBACK

SUBSCRIPTIONS

Computational Model of Electrically Coupled, Intrinsically Distinct Pacemaker Neurons

Cristina Soto-Treviño¹, Pascale Rabbah², Eve Marder³ and Farzan Nadim⁴

¹Volen Center, Brandeis University, Waltham, Massachusetts and Department of Mathematical Sciences, New Jersey Institute of Technology; ²Department of Biological Sciences, Rutgers University, Newark, New Jersey; ³Volen Center and Biology Department, Brandeis University, Waltham, Massachusetts; and ⁴Department of Mathematical Sciences, New Jersey Institute of Technology and Department of Biological Sciences, Rutgers University, Newark, New Jersey

Submitted 6 January 2005; accepted in final form 16 February 2005

ABSTRACT

TOP
ABSTRACT
INTRODUCTION
METHODS
RESULTS
DISCUSSION
GRANTS
REFERENCES

Electrical coupling between neurons with similar propertiesis often studied. Nonetheless, the role of electrical couplingbetween neurons with widely different intrinsic properties alsooccurs, but is less well understood. Inspired by the pacemakergroup of the crustacean pyloric network, we developed a multicompartment,conductance-based model of a small network of intrinsicallydistinct, electrically coupled neurons. In the pyloric network,a small intrinsically bursting neuron, through gap junctions,drives 2 larger, tonically spiking neurons to reliably burstin-phase with it. Each model neuron has 2 compartments, oneresponsible for spike generation and the other for producinga slow, large-amplitude oscillation. We illustrate how thesecompartments interact and determine the dynamics of the modelneurons. Our model captures the dynamic oscillation range measuredfrom the isolated and coupled biological neurons. At the networklevel, we explore the range of coupling strengths for whichsynchronous bursting oscillations are possible. The spatialsegregation of ionic currents significantly enhances the abilityof the 2 neurons to burst synchronously, and the oscillationrange of the model pacemaker network depends not only on thestrength of the electrical synapse but also on the identityof the neuron receiving inputs. We also compare the activityof the electrically coupled, distinct neurons with that of anetwork of coupled identical bursting neurons. For small tomoderate coupling strengths, the network of identical elements,when receiving asymmetrical inputs, can have a smaller dynamicrange of oscillation than that of its constituent neurons inisolation.

INTRODUCTION

TOP
ABSTRACT
INTRODUCTION
METHODS
RESULTS
DISCUSSION
GRANTS
REFERENCES

Cells that are electrically coupled through gap junctions arefound in numerous biological tissues, including nervous systemsof both vertebrates and invertebrates (Bennett 1997; Dermietzeland Spray 1993). The common role of electrical coupling amongneurons is believed to be synchronization of their activities(Jefferys 1995; Perez Velazquez and Carlen 2000), although theoreticalstudies show that electrical coupling can lead to more complexnetwork activity (Chow and Kopell 2000; Sherman and Rinzel 1992).When the neurons involved are intrinsically distinct, the behaviorof an electrically coupled 2-cell network can be fairly unintuitive(Medvedev and Kopell 2001; Wilson and Callaway 2000). A passiveneuron electrically coupled to an oscillatory neuron can havea nonmonotonic effect on the oscillatory cell frequency as thecoupling strength is increased (Kepler et al. 1990). Electricalcoupling between an oscillatory and a bistable neuron can resultin a wide variety of behaviors, again depending on their intrinsicproperties and the coupling strength (Kopell et al. 1998).

The rhythmically active pyloric network of the crustacean stomatogastricganglion (STG) is driven by a pacemaker kernel consisting ofone anterior burster (AB) neuron and 2 pyloric dilator (PD)neurons that are electrically coupled. The AB neuron is a smallneuron that, when isolated from all local network interactions,produces rhythmic bursts of action potentials. The PD neuronsare larger than the AB neuron and in isolation they fire tonically.Rhythmic bursting cannot be typically induced in the PD neuronsby externally injected current (Eisen and Marder 1984; Millerand Selverston 1982). These neurons also differ in the neurotransmittersthey use (Marder and Eisen 1984b), their response to neuromodulators,and pre- and postsynaptic targets (Marder and Eisen 1984a).In the intact network, the AB–PD group reliably producesin-phase bursts in a wide frequency range that can be alteredby current injection (Ayali and Harris-Warrick 1999; Eisen andMarder 1984; Hooper 1997; Miller and Selverston 1982).

We developed a model of an electrically coupled AB–PDpair. To take into account the distinct intrinsic and dynamicproperties of these neurons we used current measurements fromcultured STG neurons of the spiny lobster Panulirus interruptus(Turrigiano et al. 1995) as a starting point. To tune the modelto capture the dynamic activity of the biological pacemakerneurons, we used experimental data from the individual isolatedneurons or the isolated pacemaker group under the 2 conditionsin which they are usually experimentally studied; that is, inthe absence and presence of the descending neuromodulatory inputsto the STG.

We use this model to illustrate, at the single neuron level,behaviors that arise from coupling compartments that in isolationare capable of producing very different oscillations. At thenetwork level we explore the coupling ranges for which an intrinsicallybursting neuron drives a tonic spiking neuron to burst synchronouslywith it, and the effect of the compartmental structure on theirability to synchronize. We conclude by asking how the dynamicalrepertoire of an intrinsically bursting neuron is affected whenit is electrically coupled to an identical neuron or to an intrinsicallydistinct one.

METHODS

TOP
ABSTRACT
INTRODUCTION
METHODS
RESULTS
DISCUSSION
GRANTS
REFERENCES

Experiments

Adult male and female spiny lobsters (Panulirus interruptus),weighing 400–800 g, were purchased from Don TomlinsonFisheries (San Diego, CA) and kept in artificial seawater tanksat 12–15°C until use. Before dissection, the animalswere covered in ice for about 30 min. Standard methods (Harris-Warrick1992; Selverston et al. 1976) were used to isolate the stomatogastricnervous system [including the STG and the esophageal (OG) andthe paired commissural (CoG) ganglia], which was then pinneddown in a Sylgard-coated petri dish. The preparations were superfusedwith normal saline, 18°C, pH 7.35, containing (in mM) 12.8KCl, 479 NaCl, 13.7 CaCl₂, 10.0 MgSO₄, 3.9 NaSO₄, 11.2 Trizmabase, and 5.1 maleic acid.

The STG was desheathed to allow penetration of the cell bodies.Glass microelectrodes pulled using a Flaming–Brown micropipettepuller (Sutter Instruments, Novato, CA) were filled with 0.6M K₂SO₄ and 0.02 M KCl (resistance 15–23 M ${Omega}$ ) for neuronidentification and current injections or backfilled with 5–10%lucifer yellow (in dH₂O) backfilled with 1 M LiCl (resistance30–50 M ${Omega}$ ) for photoinactivation. Identification of theneurons was achieved by matching their intracellular recordingsto extracellular recordings on motor nerves (Selverston et al.1976).

On identification, the neurons were isolated by photoinactivatingall neurons that establish synaptic connections onto them. Thatis, for AB isolation, the 2 PD and the ventricular dilator (VD)neurons were inactivated, whereas for PD isolation, the AB,the VD, and the lateral pyloric (LP) neurons were inactivated.To isolate the AB–PD group, the VD and LP neurons wereinactivated. The complete photoinactivation procedure is outlinedin Eisen and Marder (1984), Hooper and Marder (1987), and Millerand Selverston (1982).

Once isolated, the AB neuron was impaled with 2 electrodes,one for injecting current and one for recording voltage in currentclamp. The current-injection protocol was carried out usingan Axoclamp 2B amplifier (Axon Instruments, Union City, CA).Single square pulses (duration 60 s) were injected into theAB neuron with various DC current levels to shift the baselinemembrane potential ± 70 mV from rest. For isolated PDneuron experiments, both PD neurons were impaled with 2 electrodesand current was simultaneously injected into both neurons usingthe same protocol as above. For isolated AB–PD unit experiments,the AB neuron and one PD neuron were impaled with 2 electrodeseach. Descending neuromodulatory inputs to the STG were reversiblyblocked by building a Vaseline well around the desheathed stomatogastricnerve that was filled with 1 M sucrose and 10^–6 M tetrodotoxin(TTX; Biotium, Hayward, CA).

A Digidata 1332A board was used for data acquisition and currentinjection with pClamp 9 software (Axon Instruments). The acquireddata were saved as individual binary files and were analyzedeither with the readscope software (http://stg.rutgers.edu/software/software.htm)developed in the Nadim laboratory or with scripts on a Linuxplatform.

Simulations

Each neuron was modeled with 2 compartments, one representingthe soma, primary neurite, and dendrites (S/N), and the otherrepresenting the axon (A). Each A compartment is responsiblefor the production of action potentials. In each compartmentthe membrane potential V obeyed the current conservation equation

where C is the membrane capacitance, I_extis the externally injected current, I_int is the sum of intrinsicand modulatory currents, and I_coup is the sum of the axial current(I_axial) from the adjacent compartment and (in the case of theS/N compartment) the gap-junctional current (I_gap).

The intrinsic and modulatory currents were based primarily onexperimental data from P. interruptus cultured STG neurons (Turrigianoet al. 1995).

These currents are described as a product of a maximal conductanceg_i, activation m_i, and inactivation h_i variables, and a drivingforce (V – E_i), where E_i is the reversal potential thatcorresponds to the particular ion i

Theexponents p_i and q_i take integer values between 0 and 4, dependingon the current type. The behavior of the activation and inactivationvariables is described by

where m and h represent the steady-state values, and ${tau}$ _m and ${tau}$ _hare the respective time constants. The dependency on voltageand intracellular Ca²⁺ concentration ([Ca²⁺]) of each of thesefunctions is given in Table 1. The steady-state activation ofI_KCa also depends on [Ca²⁺] (Table 1). The values of maximalconductances g_i are given in Table 2.

View this table:
[in this window]
[in a new window]

TABLE 1. Voltage and calcium dependency for the steady-state activation m and inactivation h of the currents

View this table:
[in this window]
[in a new window]

TABLE 2. Parameter values of the model

In the S/N compartments, [Ca²⁺] is governed by

where ${tau}$ _Ca is the Ca²⁺ buffering time constant, C_o is the backgroundintracellular Ca²⁺ concentration, and the factor F translatesthe total Ca²⁺ current I_Ca (in nA) into an intracellular concentration.The values of ${tau}$ _Ca, F, and C_o used in this model are given inTable 2.

The reversal potential E_Ca for the calcium currents was computedusing the intracellular calcium concentration from the Nernstequation, assuming an extracellular concentration of 13 mM (Buchholtzet al. 1992). All other reversal potentials were constant andare given in Table 2.

In the case of the model AB neuron, the presence of neuromodulatoryinputs was modeled by adding a fast, noninactivating, voltage-gated,inward current referred to as the modulatory proctolin currentI_proc (Golowasch et al. 1992; Swensen and Marder 2000). Thevoltage dependency and related parameters of the proctolin currentare described in Tables 1 and 2. Because, in P. interruptus,proctolin has no effect on the biological PD neuron (Hooperand Marder 1987), we modeled the presence of neuromodulatoryinputs in the PD neuron not by adding I_proc, but as an increasein the maximal conductance of the Ca²⁺ currents (Table 2), whichhave been shown to be targets of modulation in this neuron (Johnsonet al. 2003).

The mathematical description for the axial currents I_axial andthe gap-junctional currents I_gap is the same. For each modelneuron the axial current in the S/N compartment I_{axial_S/N} isthe product of an axial conductance and the difference of themembrane potential in the A and S/N compartments

Similarly, I_gap is the product of a gap-junctional conductanceand the membrane voltage difference of the 2 S/N compartments

Coupling currents in coupled compartmentswere symmetrical: I_{axial_S/N} = –I_{axial_A} and I_{gap_PD} = –I_{gap_AB}.

To distinguish between weak bursting and irregular spiking,for both experimental data and simulation results, burstingwas considered weak when the amplitude of the slow wave oscillationwas between 2 and 4 mV and either the number of spikes per burstwas <3 or the oscillation period was irregular. When theslow wave was <2 mV in amplitude the behavior was labeledas spiking.

Simulations were performed on a PC with the Linux platform usingthe network software developed in the Nadim laboratory. We useda 4th-order Runge–Kutta numerical integration method withtime steps of 0.05 and 0.01 ms.

RESULTS

TOP
ABSTRACT
INTRODUCTION
METHODS
RESULTS
DISCUSSION
GRANTS
REFERENCES

The behavior of the AB–PD network in response to current injection

To tune the qualitative behavior of the model to match thatof the biological network, we used a dynamic perturbation ofthe biological AB–PD oscillator after synaptic isolationfrom other STG neurons. By injecting different values of constantDC current into the AB or PD neurons, the activity of theseneurons was changed from quiescent to bursting to tonic firingin different conditions. We first examined the activity of theseneurons with the neuromodulatory inputs to the STG intact.

A comparison between the behavior of the biological neurons(left traces) and the model (right traces) is shown in Fig. 1.In each panel, the gray background illustrates the traceswith 0 current injection, and depolarizing and hyperpolarizingDC current was injected in increasing amounts. In all casesshown, the model network mimicked the activity of the biologicalneurons.

View larger version (36K):
[in this window]
[in a new window]

FIG. 1. Activity of the anterior burster (AB) and pyloric dilator (PD) neurons in response to current injection with intact modulatory inputs to the stomatogastric ganglion (STG). Gray background shows 0 current injection, + denotes positive current injection, and – denotes negative current injection. A: voltage traces of the biological (left) AB (red) and PD (blue) neurons show in-phase bursting oscillations that become faster with increasing current injection in the AB neuron. This behavior is mimicked by the model neurons (right). I_ext in nA from top: Biological, 5, 3, 0.5, 0, –8, –8.5; Model, 5, 1.1, 0.8, 0, –0.22, –0.3. Minimum V_m in mV from top: Biological AB, 36, –41, –49, –51, –85, –86; Biological PD, –41, –42, –45, –46, –53, –54; Model AB, –45.2, –47.5, –48, –53, –52.4, –51; Model PD, –46, –46.5, –48.1, –53, –52.4, –51. Model pacemaker has a frequency range of 0.22 to 1.7 Hz. B: voltage traces of the synaptically isolated biological (left) and model (right) AB neurons show bursting oscillations that become faster and smaller in amplitude with injected current. I_ext in nA from top: Biological, 33, 12, 6, 0, –3, –5; Model: 8, 1.0, 0.3, 0, –0.19, –0.27. Minimum V_m of the AB neuron in mV from top: Biological, 27, –17, –36, –60, –66, –76; Model, –44.6, –51, –54.8, –58.4, –59.2, –52.75. Model AB neuron has a frequency range of 0.24 to 3.4 Hz. C: voltage traces from the isolated biological (left) and model (right) PD neurons show tonic spiking activity that increases in frequency with current injection. I_ext in nA from top: Biological, 15, 0, –1; Model: 12, 0, –0.3. Minimum V_m of the PD neuron in mV from top: Biological, –27, –50, –53; Model, –44, –46.5, –53. In the model, current injection runs were started at 0 nA with subsequent steps of 0.1 or 0.2 nA that lasted 20 to 30 s $≤$ 8 nA (in A), 1.5 nA (in B), or 12 nA (in C). Current was then reset to 0 nA and subsequently decreased to –0.3 nA in steps of –0.01 nA or –0.02 nA.

In the intact network (Fig. 1A), with 0 current injection, theAB and PD neurons showed in-phase rhythmic bursting activity.Hyperpolarization of the AB neuron caused the bursting cycleto slow down and the amplitude of the oscillations to decrease.With sufficient hyperpolarization, the neurons became quiescent.Depolarization of the AB neuron increased the oscillation frequencyand decreased its amplitude. The electrically coupled modelAB–PD neurons showed behavior similar to that of the biologicalneurons (Fig. 1A).

The isolated biological AB neuron always showed bursting oscillationsand showed a similar response with the oscillation frequencyincreasing as the depolarization was increased (Fig. 1B, left).However, in contrast with the intact AB–PD network, theamplitude of oscillations consistently decreased as a functionof injected current. The isolated AB neuron typically did notexhibit pure tonic firing with large injected DC current. Insteadit produced high-frequency and low-amplitude bursts of 2–3action potentials (Fig. 1B, left top trace). The isolated modelAB neuron showed behavior similar to that of the biologicalneuron.

In contrast to the isolated AB neuron, isolated biological PDneurons typically showed only tonic spiking activity (Fig. 1C,left middle trace) whose frequency increased with injected current.Injection of negative current silenced this activity. In somecases (n = 2 of 5), the isolated PD neuron showed weak (small-amplitudeand irregular) rhythmic bursting activity that turned into tonicspiking with positive current injection (data not shown). Again,the model PD neuron (Fig. 1C, right) showed behavior similarto that of the biological neuron.

Removing the neuromodulatory inputs to the STG drastically changesthe activity of the AB–PD network (Bal et al. 1988; Millerand Selverston 1982; Selverston and Miller 1980). The activityof the AB–PD kernel in the absence of neuromodulatoryinputs is shown in Fig. 2. Without current injection the biologicalAB–PD neurons were typically quiescent (Fig. 2, bottomleft panel, gray) or weakly tonically active (not shown). Injectionof positive DC current caused these neurons to produce weakbursting oscillations with 1–3 spikes per burst. The oscillationfrequency increased and its amplitude decreased with injectedcurrent. Removal of the modulatory currents in the model ABand PD neurons (Fig. 2, right) resulted in a model AB–PDkernel that showed behavior similar to that of the biologicalcoupled AB–PD neurons.

View larger version (44K):
[in this window]
[in a new window]

FIG. 2. Activity of the AB and PD neurons in response to current injection in the AB neuron in the absence of modulatory input. Biological AB (red) and PD (blue) neurons are quiescent with no current injections (gray background; left traces). Positive DC current injection (+) in the biological AB neuron evokes in-phase bursting oscillations that become faster with increasing current levels (left). This behavior is reproduced by the model neurons (right). I_ext in nA from top: Biological, 10, 6, 1, 0; Model, 1, 0.6, 0.2, 0. Minimum V_m in mV from top: Biological AB neuron, –12, –35, –66, –77; Biological PD neuron, –51, –52, –55, –56; Model AB neuron, –45.3, –45.8, –48.2, –49.7; Model PD neuron, –47.7, –47.7, –48.5, –49.8. In the model, current injection runs were started at 0 nA, with subsequent steps of 0.2 to $≤$ 2 nA. Each run was 30 s.

In the absence of neuromodulatory inputs, the isolated biologicalAB neuron was silent (n = 4 of 5). (In one preparation, however,small-amplitude oscillations were recorded in the isolated ABneuron.) Positive current injection produced very weak burstswith 1–2 spikes per burst (n = 5, data not shown). Theisolated PD neuron showed tonic activity very similar to itsactivity in the presence of neuromodulatory inputs (n = 3, datanot shown).

Figure 3A shows a qualitative comparison of the waveforms ofthe AB neuron when coupled to the PD neurons (thin trace) andafter isolation from the PD neurons (thick trace). The amplitudeand number of spikes/burst were measured in 5 preparations (5cycles each), and consistent with the data shown in Fig. 3A,the spike amplitude per burst increased by an average of 142%(SD 64%), whereas the number of spikes per burst decreased byan average of 45% (SD 11%). Figure 3B shows a similar comparisonof the waveforms for the model AB neuron, in isolation (thicktrace) and when coupled to the model PD neuron (thin trace).The model AB neuron showed a decrease in burst amplitude andincrease in period when coupled to the model PD neuron, as wellas an increase in the burst duration and the number of spikesper burst. These changes were consistent with the experimentalresults. These data show that the amplitude of the AB neuronslow wave is significantly decreased by its coupling to thePD neurons.

View larger version (21K):
[in this window]
[in a new window]

FIG. 3. Membrane potential waveform of the AB neuron is changed by electrical coupling to the PD neuron. A: intracellular recordings show the waveforms of an AB neuron when electrically coupled (thin trace) to the PD neuron and when isolated (thick trace). On isolation, the average spike amplitude increased and the average spike number per burst decreased. Minimum V_m (in mV): –61.3 for coupled and –62.9 for isolated AB neuron. B: a comparison of the waveforms in the model AB neuron when it is coupled to the PD neuron (thin trace) and when isolated (thick trace) shows that the isolated AB neuron waveform has a larger amplitude and shorter period, as in the biological neuron. Spike number per burst also decreased. Minimum V_m (in mV): –53.5 for coupled and –58.4 for isolated AB neuron.

Understanding the network model behavior as a function of its components

The AB–PD neuron model described in the previous sectionhas a number of properties. We now describe how these propertiescontribute to the behavior of the model, and use these to makesome more general statements about networks in which nonidenticalneurons are electrically coupled.

THE TWO COMPARTMENTS OF THE MODEL NEURONS. There have been previous models that were inspired by the pyloricpacemaker neurons, focusing on the effect of electrical couplingon the frequency of an oscillator to a second neuron that wassilent or tonically active (Kepler et al. 1990), and on theeffects on frequency and burst duration of electrically coupled2-dimensional oscillators (Abbott et al. 1991; Meunier 1992).These studies provided valuable insights into the nature ofelectrical coupling, but were not meant to reproduce the dynamicbehavior of the pyloric pacemaker neurons. To build a biophysicallyplausible model that accounted for the specific intrinsic propertiesof the individual neurons, we based our model on voltage-clampdescriptions of the ionic currents in cultured STG neurons (Turrigianoet al. 1995). We then adjusted the parameters of the ionic currents,as described later in RESULTS, to reproduce the behavior ofthe biological pacemaker neurons, both in isolation and as agroup.

Figure 4A shows a schematic representation of the segregationof the currents in the 2 compartments in the model neurons.The currents responsible for action potential generation wereseparated from those responsible for the generation of slowoscillations (approximately 1 Hz; see Fig. 4B) for the followingreasons: 1) Pyloric neurons produce slow-wave voltage oscillationsin the absence of action potentials (Raper 1979). 2) Under somemodulatory conditions (such as high-frequency stimulation ofthe inferior ventricular nerve, a modulatory nerve that connectsthe brain to the stomatogastric nervous system), the PD neuronis able to produce long, slow bursts (Eisen and Marder 1984;Miller and Selverston 1982).

View larger version (27K):
[in this window]
[in a new window]

FIG. 4. Compartmentalization of the model neurons. A: schematic representation of the distribution of intrinsic currents in the model neurons. Ionic currents responsible for action potential generation were placed in the "A" (axon) compartment. Ionic currents underlying the generation of slow oscillations were placed in the S/N (soma-primary neurite) compartment. Presence of anterior inputs was modeled with a voltage-gated inward current I_proc in the model AB neuron, and with larger calcium currents I_CaS and I_CaT in the model PD neuron. In B, C, and D, the top voltage traces correspond to the AB neuron and the bottom voltage traces to the PD neuron; the left traces show the membrane potential of the S/N compartments, whereas those on the right show the A compartments. B: activity of each compartment is shown in isolation, with parameters as described in Table 2. Lowest voltage values are for the AB neuron: –63.5 mV (S/N), –60 mV (A); for the PD neuron: –73 mV (S/N), –57.5 mV (A). C: each S/N compartment shown in B is joined to the corresponding A compartment, with axial conductances as in Table 2. Resulting input resistances were 14.8 M ${Omega}$ (AB) and 6.9 M ${Omega}$ (PD). Lowest voltage values are for the AB neuron: –58.4 mV (S/N), –74 mV (A); for the PD neuron: –46.5 mV (S/N), –72.5 mV (A). D: 2 S/N compartments shown in C are electrically coupled to simulate a gap junction with maximal conductance as in Table 2. Two model neurons now burst in-phase. Lowest voltage values are for the AB neuron: –53.5 mV (S/N), –74 mV (A); for the PD neuron: –53.5 mV (S/N), –73 mV (A).

In each model neuron, the action potentials were generated inthe axon (A) compartment by fast sodium I_Na and delayed-rectifierpotassium I_Kd currents with Hodgkin–Huxley type dynamics.The compartments labeled as S/N represent the soma and primaryneurite. The A compartment was excitable, but in isolation fromthe S/N compartment remained quiescent (Fig. 4B). In the S/Ncompartment, the intrinsic outward currents were a delayed-rectifierI_Kd, a calcium-dependent I_KCa, and a transient I_A potassiumcurrent. The inward currents consisted of a transient I_CaT anda persistent I_CaS calcium current, a persistent sodium currentI_NaP, and a hyperpolarization-activated inward current I_h. Tomodel the effect of descending modulatory inputs, a voltage-gatedinward current (such as the one activated by the neuropeptideproctolin) I_proc was added to the S/N compartment of the modelAB neuron (Fig. 4A) (Hooper and Marder 1987

; Marder et al. 1986

;Swenson and Marder 2000

). In the case of the isolated biologicalPD neuron in P. interruptus, however, proctolin has been reportedto show no noticeable effect (Hooper and Marder 1987

). Thusthe presence of modulatory inputs in the PD neuron was modeledas a slight increase in the conductances of the 2 Ca²⁺ currents(Johnson et al. 2003

). Together with the leak current I_L, thecurrents in the S/N compartments generated large-amplitude (about35 mV) slow oscillations with a frequency of about 1 Hz (Fig.4B). In the absence of I_KCa, the membrane potential remainedin a depolarized steady state (not shown).

Figure 4C shows the results of coupling each of the S/N compartmentswith its respective A compartment, with axial conductances asshown in Table 2. In the model AB neuron, the electrical interactionbetween the excitable A compartment and the intrinsically oscillatoryS/N compartment produced intrinsic bursting activity (Fig. 4C,top panel). In contrast, in the case of the PD model neuron(Fig. 4C, bottom panel), the electrical interaction betweenthe excitable A compartment and the intrinsically oscillatoryS/N compartment produced tonic spiking activity (see followingtext). The electrical synapse between the AB and the PD neuronswas modeled by coupling the 2 S/N compartments (gap-junctionalconductances as in Table 2). This coupling caused the PD neuronto burst in-phase with the AB neuron (Fig. 4D), as seen in thebiological network.

THE ROLES OF AXIAL AND GAP-JUNCTIONAL CONDUCTANCES. Figure 5, A and B show the isolated AB and isolated PD modelneurons, respectively, as the axial conductance between their2 compartments was increased from top to bottom. The gray backgroundshows the "reference" model with parameters as in Tables 1 and2. When the axial conductance between the S/N and A compartmentsof the isolated AB neuron was weak, the activity of the S/Ncompartment of this neuron was very similar to that of its isolatedS/N compartment (Fig. 5A, top trace). As the axial conductancewas increased, both the spike amplitude and the number of spikesper burst consistently increased. In contrast, the AB neuronburst amplitude and period behaved nonmonotonically: they initiallydecreased and then increased. Increasing the axial conductancevalue to 1.3 µS served to merge the S/N and A compartmentsof the model AB neuron and effectively turn it into a one-compartmentbursting neuron (Fig. 5A, bottom trace). Note that, in thiscase, the amplitude of the action potentials was considerablylarger. (This increase occurred as a fairly sudden transitionas the axial conductance was increased from 0.4 to 0.5 µS;not shown). Irrespective of the strength of the axial coupling,the AB neuron always remained an intrinsic burster, althoughas the coupling was increased more than 0.4 µS the waveformof the biological AB neuron was lost.

View larger version (22K):
[in this window]
[in a new window]

FIG. 5. Effects of varying the axial and gap-junctional conductances. Gray boxes show the activity of the "reference" model. A: behavior of the S/N compartment of the isolated model AB neuron as the axial coupling between the S/N and A compartments is increased. Values (in µS) shown to the right are the maximal conductance of the axial current. Most hyperpolarized voltages in each trace are, from top (in mV): –61, –58.5, –58.4, –59.5, and –69. B: behavior of the S/N compartment of the isolated model PD neuron as the axial coupling between the S/N and A compartments is increased. Values (in µS) shown to the right are the maximal conductance of the axial current; note that there is bistability at 0.8 µS. There was no change in the behavior of the neurons when couplings larger than those shown were used. Most hyperpolarized voltages are (from top to bottom in mV): –71, –67.8, –46, –46.5, –48.5, –52, –55, and –64. C: behavior of the pacemaker AB–PD network as the gap-junctional conductance is increased. Red traces correspond to the AB neuron, the blue traces to the PD neuron. Traces are superimposed on the right to allow a direct comparison of the waveforms. Values (in µS) shown to the right are the gap junction conductances. Most hyperpolarized voltages are (from top to bottom in mV): –52.6, –54.7, –53.5, –57, and –58. In all cases, the simulations were started from the "reference" AB–PD model (Table 2), and the conductance of interest was changed in increments or decrements of 0.05 µS, with each run using as initial conditions the last point of the previous run.

In contrast, as the axial conductance between the 2 compartmentsof the model isolated PD neuron was increased (Fig. 5B), therewas a range of coupling values (0.9 to 2.5 µS) for whichit was not able to produce intrinsic bursting oscillations.For small coupling values, small to medium-size spikes rodeon top of the slow-wave oscillation of the S/N compartment.As the axial conductance increased, the coupling current hada hyperpolarizing effect on the burst phase of the S/N compartmentthat eventually prevented the S/N compartment from producingslow oscillations. The S/N compartment, however, could stillinduce spiking in the A compartment and thus the neuron spikedtonically. Both irregular bursting and tonic spiking could beobtained for the same conductance strength, as is shown in thesecond and third traces of Fig. 5B. Further increasing the axialconductance served to increase the spike frequency (and amplitude)and to subsequently cause enough calcium ion accumulation toactivate I_KCa and thus restore bursting. For large axial coupling(in excess of 20 µS), the model was effectively a single-compartmentburster with overshooting spikes (Fig. 5B, bottom trace).

Figure 5C shows the behavior of the model AB–PD pacemakergroup as the strength of the electrical coupling between the2 neurons was increased from top to bottom by varying the gap-junctionalconductance values. The gray background shows the "reference"model with parameters as in Tables 1 and 2. For very small coupling,the AB neuron produced irregular bursting and, although thePD neuron produced long, small-amplitude bursts, it was notable to fire in phase with the AB neuron (Fig. 5C, top panel).As the coupling strength increased, both model neurons producedregular bursts, but the PD neuron burst started slightly afterand lasted longer than the AB neuron burst. In this case, thespikes of the 2 neurons occurred out of phase (Fig. 5C, secondtrace). Further increasing the coupling strength caused theslow-wave oscillation of the neurons to become better aligned,the number of spikes per burst to increase, and the spikes (althoughnot completely synchronized) to occur almost in phase (Fig.5C, superimposed traces in middle panel). For the waveformsof the AB and PD neurons to be almost indistinguishable fromeach other, the coupling strength needed to be further increased,as shown in the bottom trace in Fig. 5C. Remarkably, for morethan a 50-fold range of gap-junctional conductance values (0.1–6µS) the coupled AB–PD pacemaker group produced qualitativelysimilar synchronous bursting oscillations. In the followingsubsection, we show that this need not be the case if the modelneurons involved are one-compartment neurons.

TWO-COMPARTMENT MODELS PROVIDE A MORE ROBUST BURSTING MECHANISM FOR THE PACEMAKER NETWORK. Thus far, we have used our 2-compartment per neuron model toshow that it is possible for an intrinsically bursting neuronto drive a tonically spiking neuron to oscillate in synchronywith it for a wide range of coupling strengths. We now addressthe question of whether it is possible to obtain similar resultswith one-compartment model neurons. To answer this question,we built several AB–PD networks, and assayed the networkoscillations as the gap-junctional strength was varied (Fig. 6).We used 2 distinct versions of the model AB and PD neurons.These were either the "reference" model neurons (AB and PD)or slightly modified versions of these neurons (AB and PD).The S/N compartment of the PD neuron was intrinsically oscillatory,as in Fig. 4B, whereas that of PD lacked I_KCa and thus PD hadno intrinsic ability to oscillate (and was quiescent). The ABneuron had a smaller transient calcium current I_CaT (g_CaT =42 µS) than that of the AB neuron, which decreased theslow oscillation amplitude. This reduction in g_CaT was doneso that the one-compartment (see following text) AB neuron wouldhave a slow-wave oscillation similar to that of the 2-compartmentreference AB neuron.

View larger version (42K):
[in this window]
[in a new window]

FIG. 6. Comparison of the behavior of different AB–PD networks constructed from one- and 2-compartment model neurons. A: each column shows examples of outputs from a given network as the maximal conductance of the gap junction is increased from top to bottom. Red voltage traces correspond to the model AB neuron and blue traces to the model PD neuron. Diagram on top of each column describes the type of model neuron used. Two-compartment models are shown with a thin line connecting the S/N and A compartments; one-compartment model neurons are shown with whole region between the 2 compartments shaded. Each of the 2 columns in Cases I–IV is built with the same AB neuron but 2 different PD neurons. Gray box shows the activity of the "reference" AB–PD network. Isolated neurons differ from the maximal conductances shown in Table 2 as follows. Case I AB: no difference; Case II AB g_CaT = 42 µS and g_axial = 100 µS; Case III AB: g_axial = 100 µS; Case IV AB: no difference. Cases I, II, and III model PD neurons: g_Na = 2500 µS in the A compartment and g_axial = 100 µS. Cases I, II, and III model PD neurons: g_Na = 2500 µS in the A compartment, g_KCa = 0 and g_axial = 500 µS. Case IV PD: no difference; Case IV PD: g_KCa = 0. Values for the gap-junctional conductances are (from top in µS): Case I AB–PD: 0, 0.4, 1.0, 1.6, 100. Case I AB–PD: 0, 0.1, 1.6, 2, 100. Case II AB–PD: 0, 0.2, 0.75, 3, 100. Case II AB–PD: 0, 0.2, 1.5, 3, 100. Case III AB–PD: 0.4, 1.2, 2,100. Case III AB–PD: 0, 0.2, 0.8, 1.5, 100. Case IV: 0, 0.1, 0.75, 3, 100. Most hyperpolarized voltage values for the traces are (from top in mV). Case I AB–PD, AB: –58.2, –51, –52, –53, –69; PD: –71.2, –71, –70, –68, –69. Case I AB–PD, AB: –58.2, –50.2, –54.5, –68, –62.7, –68; PD: –73, –73, –70, –73.2, –68. Case II AB–PD, AB: –58.4, –45.8, –49.4, –63.6, –69; PD: –71.2, –71.2, –70, –71.5, –69. Case II AB–PD, AB: –58.4, –46.4, –51.6, –63.2, –69; PD: –72, –71.8, –69, –71, –69. Case III AB–PD, AB: –68, –51.6, –53.5, –65.2, –68.8; PD: –71.2, –71, –69.4, –72, –68.8. Case III AB–PD, AB: –68, –58.2, –49.2, –65.5, –68.8; PD: –72, –71.5, –70, –71.2, – 68.8. Case IV AB–PD, AB: –58.2, –54.5, –52.9, –53.7, –59.9; PD: –71.2, –51.2, –53, –56.7, –59.9. Case IV AB–PD, AB: –58.2, –49.8, –51.5, –55.8, –59.5; PD: –72, –47, –51.6, –55.8, –59.5. B and C: ratio of the AB neuron burst amplitude when coupled to the PD neuron to the burst amplitude of the isolated AB neuron shown as a function of the maximal gap-junctional conductance. A zero ratio corresponds to a coupled AB neuron that produces tonic spikes instead of bursting oscillations. B: plots of the burst amplitude ratios are shown for both the AB–PD network (B) and the AB–PD network (C) in Cases I–IV.

We then addressed the significance of compartmentalization bycomparing the one- and 2-compartment model neurons. The one-compartmentneurons were obtained by increasing ( $≥$ 100-fold) the axial conductancebetween the A and S/N compartments, thus effectively collapsingthe 2 compartments. (These are shown schematically in Fig. 6Awith the whole region between the 2 compartments shaded.) Thenetworks were divided into 4 cases (I–IV) and in eachcase, we compared the coupling of the AB (or AB) neuron to eitherthe PD or the PD neuron, resulting in a total of 8 networks(Fig. 6A). The behavior of the "reference" AB–PD networkis highlighted in the gray box in Fig. 6A. The case of the 2-compartmentAB was similar to Case I and it is not shown.

To measure the electrical "load" that the PD neuron placed onthe AB neuron, the burst amplitudes of the coupled and isolatedAB neurons (see Fig. 6A) were compared for the networks thatproduced synchronous bursting. When the network output was tonic,the ratio of the burst amplitudes was set to zero. The ratiosas a function of the gap-junctional conductance were plottedfor Cases I–IV (Fig. 6, B and C). These ratios were comparedwith the range (0.65–0.85) calculated from the biologicalAB neuron as in the experiment shown in Fig. 3A.

In Case I, we used the "reference" 2-compartment model AB neuronand coupled it to either a one-compartment model PD (Fig. 6A,left column) or model PD neuron (Fig. 6A, right column). Incontrast to PD, PD was able to burst in synchrony with the ABneuron for all coupling strengths (Fig. 6A, Case I). However,the burst amplitude of the AB neuron increased as the couplingstrength was increased, irrespective of whether it was coupledto PD or PD (Fig. 6A, Case I). When AB was coupled to PD, therange of gap-junctional conductances for which the burst amplituderatio remained within the biological range (0.65–0.85)was approximately 1–2 µS (see Fig. 6A, Case I, leftcolumn, fourth panel from top, g_gap ${cong}$ 1.6 µS, and Fig.6B, orange circles). For large coupling conductances (g_gap >2µS), this AB–PD network output was very similarto that of the 2-compartment AB neuron with large axial coupling(compare Fig. 6A, Case I, left column, bottom panel to Fig.5A, bottom panel). When the AB neuron was coupled to the PDneuron (Fig. 6A, Case I, right column), the network behaviorprogressed from tonic spiking for small to moderate couplingconductances to large-amplitude bursting for large couplingconductances (g_gap >2 µS; Fig. 6A, Case I, right paneland Fig. 6C, orange circles).

In Case II, we replaced the 2-compartment AB neuron with theone-compartment AB neuron that had similar slow-wave amplitudeof oscillations (compare the top voltage traces in Fig. 6A,Cases I and II). When the model AB neuron was coupled to theone-compartment model PD neuron, this network was able to producebursting oscillations for only moderate to large coupling strengths(Fig. 6A, Case II, left column). However, the burst amplituderatios of the coupled to the uncoupled AB neuron calculatedas the gap-junctional conductance was increased did not fallwithin the biological range (Fig. 6B, green triangles), suggestingthat the burst amplitudes of AB were either too small or toolarge. Coupling the AB neuron to the one-compartment PD neuronproduced only tonic spiking behavior for all but large couplingstrengths, in which case the burst amplitude of AB was againtoo large (Fig. 6C, green triangles).

In Case III, the burst amplitude of the one-compartment modelAB neuron was considerably larger (84%) than that of the "reference"AB neuron. Even with this larger-amplitude oscillation in themodel AB neuron, however, when it was coupled to the one-compartmentmodel PD (Fig. 6B, blue inverted triangles) or PD (Fig. 6C,blue inverted triangles) neuron, the range of gap-junctionalconductances for which the burst amplitude ratio of the AB neuronwas adequate was very small. As in Cases I and II, with largecoupling strengths, the network behavior was very similar tothat of the 2-compartment AB neuron with a large axial conductance(compare the bottom panel of Fig. 5A to the bottom panels ofthe first 6 columns in Fig. 6A). From these results, we suggestthat a one-compartment model PD (and PD) neuron behaves as anadditional "axon" on the AB oscillator.

In contrast, as shown in Case IV, the 2-compartment per neuronnetworks were able to function like the biological pacemakerfor a wider range of coupling strengths (Fig. 6A). The burstamplitude ratio of the coupled to the uncoupled model AB neuronremained in the biological range for a much wider range of gap-junctionalconductances than in any of the previous cases (see Fig. 6, B and C,black squares). However, similar to Cases I–III,large coupling strengths increased the burst amplitude of theAB neuron to values that were beyond the biological range. Theburst durations in Case IV remained stable for all couplingstrengths (21–38 ms) as opposed to the networks with one-compartmentneurons, in which the burst durations shortened for large couplingstrengths (10–15 ms). A similar shortening of the burstduration occurred in the isolated model AB neuron when the axialcoupling between its 2 compartments was large (see Fig. 5A,bottom trace). This is consistent with our earlier suggestion,based on burst amplitudes, that the one-compartment model PD(and PD) neuron behaves as an additional "axon" on the AB oscillator.

Functional consequences of electrically coupling two identical and two distinct neurons

So far we showed that compartmentalization provides a reliablemechanism for the model neurons to produce in-phase bursts whenthey are electrically coupled. We then proceeded to examinethe functional consequences of coupling identical or differentneurons on bursting oscillations. We did this by comparing amodel AB–AB network to the reference model AB–PDnetwork and to the isolated AB neuron. We assayed differencesamong these models by measuring the range of oscillation periodseach model produced in response to DC current injection (Fig. 7).For each value of the gap-junctional conductance, increasinglylarger amounts of hyper- or depolarizing DC current were injectedin the S/N compartment of one of the coupled neurons until thenetwork became silent or produced irregular bursts or tonicactivity.

View larger version (19K):
[in this window]
[in a new window]

FIG. 7. Oscillation period range of a model AB–AB network and the model AB–PD network as a function of the gap-junctional strength (in µS). Burst period range was obtained by DC current injection in the AB neuron (A, B) or the PD neuron (C), as depicted in the inset schematic network diagrams. Dashed curve represents no current injection; the top curve corresponds to the longest possible period that the network produced with hyperpolarizing current injection before becoming quiescent; the bottom curve represents the shortest period that the network produced with depolarizing current injection before the bursts became irregular or changed to tonic spiking. Gray area shows the burst period range of the isolated AB neuron. White insets show 2 s long voltage traces of the coupled neurons for a coupling conductance of 0.1 µS and the largest hyperpolarizing current injection. Voltage in the insets is from –60 to –30 mV. A: an AB–AB model network cannot oscillate with periods longer than those of an isolated AB model neuron. For small coupling conductances (<0.3 µS) its period range was smaller than that of the isolated AB neuron. Inset: 2 phase-locked AB neurons when hyperpolarizing current (I = –0.41 nA) was applied to one of them (lighter trace). B: when current is injected into the model AB neuron, for small to moderate coupling conductance the AB–PD network can produce slower (but not faster) oscillations than the isolated AB neuron. Inset: phase-locked bursting with the PD neuron bursting slightly earlier, as hyperpolarizing current (I = –0.23 nA) was injected into the AB neuron. C: when current is injected into the model PD neuron, the AB–PD network period range of oscillations is smaller than that of the isolated AB. Inset: phase-locked bursting, with the AB neuron bursting slightly earlier, as hyperpolarizing current (I = –0.27nA) was injected into the PD neuron. Most hyperpolarized voltages in the insets are (in mV): –56.5 (A), –48.2 (B), and –52.2 (C).

The 2 limits of the oscillation period range produced by theAB–AB network when DC current was applied to one AB neuronare plotted in Fig. 7A. In the absence of current injection(dashed line) for all coupling strengths the bursting oscillationproduced by each of the coupled AB neurons was indistinguishablefrom each other and from those of the isolated model AB neuron.However, the asymmetry introduced by injecting DC current intoone of the 2 identical AB neurons when they were weakly coupleddid not allow them to completely synchronize but instead causedthem to become phase-locked, as shown in the inset of Fig. 7A(g_gap = 0.1 µS). The AB neuron that received the hyperpolarizingDC input (Fig. 7A, inset, lighter red trace) burst after itscoupled twin neuron. Note that when the 2 identical AB neuronsare completely in phase, I_gap = 0 (not shown). In contrast,the slightly out of phase oscillation of the coupled AB neuronsresults in a nonzero I_gap, thus producing a load on the oscillationof each neuron. As a result, for weak coupling strengths (g_gap<0.3 µS), the period range of the AB–AB networkwas actually smaller than that of the isolated AB neuron (periodrange of isolated AB marked with gray area). As the gap-junctionalconductance was increased, however, the period range of theAB–AB network approached that of the isolated AB neuronuntil they became identical for g_gap >15 µS (not shown).For all coupling strengths shown, the hyperpolarizing DC currentinjection that caused the coupled AB neuron to become quiescentwas 100% more than the current for the isolated AB neuron. Incontrast, the minimum depolarizing DC current that caused thecoupled AB neuron to produce tonic spiking, compared with thecurrent for the isolated AB neuron, increased from 31% (at g_gap= 0.1 µS) to 315% (at g_gap = 3 µS) as the gap-junctionalconductance was increased.

Figure 7B shows that with small to moderate gap-junctional conductances,the AB–PD network could oscillate with longer periods( $≤$ 18%) than the isolated AB neuron. The inset in Fig. 7B showssimultaneous voltage traces of weakly coupled (g_gap = 0.1 µS)model AB and PD neurons when the AB neuron was hyperpolarized(note that the 2 neurons are more in phase here than those shownin the other 2 insets of Fig. 7). For larger coupling strength(g_gap = 3 µS), the longest period that the coupled AB–PDnetwork produced was 26% smaller than that produced by the isolatedAB neuron (Fig. 7B) and decreased $≤$ 46% for even larger coupling(g_gap = 100 µS; not shown). For the range of couplingstrengths shown in Fig. 7B, the hyperpolarizing DC current necessaryto silence the coupled AB–PD network was 15% more thanthe current for the isolated AB neuron, whereas the depolarizingDC current necessary for transition to tonic spiking was nevermore than 50% of the current for the isolated AB neuron. Takentogether, these results suggest that, for moderate couplingstrengths, the presence of the PD neuron broadens the periodrange of the AB–PD network to encompass larger periods( $≤$ 5 s) as DC current is injected into the AB neuron, whereasit continues to buffer the activity of the AB neuron from hyperpolarizinginputs.

When DC current was injected into the PD neuron, the periodrange of the AB–PD network was smaller than that of theisolated AB neuron for all coupling strengths (Fig. 7C). Theinset of Fig. 7C (g_gap = 0.1 µS) illustrates that forsmall coupling strengths, the injection of hyperpolarizing currentinto the model PD neuron was more effective in disrupting synchronousbursting of the AB–PD network (the AB neuron fired slightlyearlier than the PD neuron) than current injection into themodel AB neuron (compare with inset of Fig. 7B). For small tomoderate coupling strengths, hyperpolarizing current injectioninto the PD neuron prevented the network from oscillating asslowly as it would if current were injected into AB. As thegap-junctional conductance was increased (Fig. 7, B and C),the difference in oscillation range as a consequence of currentinjection into either the AB or PD neuron slowly diminished,and eventually the oscillation ranges became identical (g_gap= 100 µS, not shown). For the range of gap-junctionalconductances shown in Fig. 7C, the amount of hyperpolarizingDC current (injected in the PD neuron) that caused the AB–PDnetwork to become silent was 15 to 35% more than the currentfor the isolated AB neuron. Thus, similar to the case shownin Fig. 7B, the presence of the model PD neuron buffered theAB–PD network from hyperpolarizing inputs. However, inthis case, the model AB–PD network was able to tolerateonly 10 to 24% of the amount of depolarizing current that theisolated AB neuron would before transitioning to tonic spiking.These values should be contrasted with the much larger depolarizingcurrent necessary to eliminate bursting in the AB–AB network(Fig. 7A), despite the fact that the PD neuron had a lower inputresistance than that of the AB neuron (14.8 M ${Omega}$ for AB and 6.9M ${Omega}$ for PD; see also legend of Fig. 4).

The role of ionic currents in the model and the action of neuromodulators

The biological AB and PD neurons are differentially modulatedby a variety of different amines and neuropeptides (Ayali andHarris-Warrick 1999; Flamm and Harris-Warrick 1986; Hooper andMarder 1987; Marder and Eisen 1984a). To provide some insightinto the function of differential modulation of 2 electricallycoupled but distinct neurons, we examined the time course ofactivity of the inward (Fig. 8, top panels) and outward (Fig. 8,bottom panels) currents when descending neuromodulatory inputswere present. Variations of the leak current I_L (plotted separatelyin the middle panels of Fig. 8) allow for a comparison of thetime course of the membrane potential in all cases because themembrane potential is linearly related to I_L (V_m = E_L + I_L/g_L).

View larger version (27K):
[in this window]
[in a new window]

FIG. 8. Currents that participate in the approximately 1-Hz oscillations in the isolated S/N compartments, and their behavior in the isolated model neuron. For each model neuron, the leftmost column shows the currents for its isolated S/N compartment, and the rightmost column shows the same currents when the S/N and A compartments are connected. Boxes in the first 3 columns display the currents at a different scale for 600-ms duration, after the first 100 ms of activity. Boxes in the fourth column display enlargements of the full 1,100 ms of activity. Parameters are as in Table 2.

The membrane potential oscillation in the S/N compartment ofthe model AB neuron was obtained by a balance between the inwardand outward currents (Fig. 8A). During the slow initial riseof the membrane potential, the inward currents barely dominatedthe outward currents until I_proc and I_CaS strongly activatedto produce a more rapid rise of the membrane potential. Thisrise was followed by a rapid increase in the outward currentI_Kd with smaller contributions from I_A and I_KCa. In the mostdepolarized phase, the outward and inward currents were in balance.At this time, the calcium-activated outward current I_KCa increased,first gradually and then rapidly, to produce a decrease in themembrane potential of the neuron, and the cycle repeated. Inthe absence of I_KCa, the membrane potential remained in a depolarizedsteady state (not shown). For the generation of this large slow-wavevoltage oscillation, I_NaP, I_h, and I_A were not necessary: theslow wave was still produced in their absence (not shown). Theoscillation period of about 1 s was set mainly by the activationand inactivation time constants of the transient calcium currentI_CaT and was modulated by the maximal conductances of the leakcurrent I_L and the outward currents I_Kd and I_KCa. To obtainoscillations with a frequency around 1 Hz, we had to modifysome parameters of the currents described in Turrigiano et al.(1995)

; the main changes were in the transient calcium currentI_CaT (activation and inactivation midpoints and their time constants)and in the calcium-dependent potassium current I_KCa (activationmidpoint).

When the S/N compartment of the AB neuron was coupled to theA compartment (Fig. 8B), an initial slow rise of the membranepotential that was similar to the uncoupled case occurred untilthe membrane potential was large enough for the axial currentto induce the generation of action potentials in the axon. Thusbegan the active or spiking phase, which subsequently endedby the activation of I_KCa. An increase of 33% in the maximalconductance of I_KCa decreased both the number of spikes perburst (by 1) and the burst duration, whereas a decrease of 50%in the maximal conductance produced a longer burst durationwith one extra spike per burst (not shown). The way in whichthe transition from bursting to tonic spiking took place asconstant depolarizing current was injected into the S/N compartmentof the AB neuron depended on the amount of I_KCa. Increasingg_KCa shortened the burst duration (with no applied current)and maintained bursting with larger amounts of current injection.With smaller g_KCa, depolarizing current injection produced atransition to the tonic spiking regime more easily. This wasa smooth transition where no irregular bursting or spiking wasseen (not shown). Similar transitions from bursting to tonicspiking without intermediate irregular bursting or spiking havebeen observed in other studies (Shilnikov and Cymbalyuk 2005).

Recall that the neuromodulatory actions on the AB neuron weremodeled by adding the ionic current I_proc. When g_proc in themodel was set to 0 to mimic the removal of neuromodulatory actionson the AB neuron, the large-voltage oscillation in the S/N compartmentof the AB neuron was lost (not shown). In this case, a small-voltageoscillation could be obtained by injecting a small constantdepolarizing current. This small oscillation was sufficientto trigger a single spike per cycle and the model neuron producedsmall-amplitude bursts, with only one spike per burst. The amplitudeof the oscillation and the number of spikes per burst couldbe increased by increasing g_CaT (not shown).

The currents involved in the generation of the large-amplitudevoltage oscillation of the S/N compartment of the isolated PDneuron are shown in Fig. 8. There were several differences betweenthese oscillations and those of the S/N compartment of the modelAB neuron. First, in the S/N compartment of the PD neuron, thepersistent calcium current I_CaS was more prominent than thetransient I_CaT. Second, the calcium-dependent potassium currentI_KCa was smaller. Third, the large oscillation as a single stablestate depended on the presence of the hyperpolarization-activatedcurrent I_h: in its absence there was bistability between a quiescentstate and the large oscillation. The oscillation still persisted,however, in the absence of I_NaP and I_A. Figure 8D shows therole of the intrinsic currents in the S/N compartment of thePD neuron when it is coupled to its A compartment. In this caseI_h provided enough background depolarization to allow the Acompartment to fire continuously. In turn the axial currentfrom the A compartment to the S/N compartment had a hyperpolarizingeffect that prevented it from continuing to produce large-amplitudeoscillations and thus the 2-compartment neuron spiked tonically.Note that the leak current was now entirely outward becausethe spiking occurred above the leak reversal potential (–60mV), and that I_KCa played a very small role. In this case thesmaller I_CaT to I_CaS ratio and smaller I_KCa (compared with themodel AB neuron S/N compartment) were essential to produce thecorrect output for the isolated PD neuron. If either g_CaT wasincreased by more than 15% or g_KCa was increased by 80% the2-compartment PD neuron became an intrinsic burster (not shown).However, if both g_CaT and g_CaS were increased by 20%, the 2-compartmentcoupled PD neuron remained tonically spiking. An increase ofmore than 50% of g_NaP could also turn this spiking neuron intoa bursting one, whereas an increase of more than 50% in g_A causedit to become quiescent (not shown).

We modeled the removal of the neuromodulatory inputs onto thePD neuron by a slight decrease in the maximal conductance ofthe calcium currents. The persistent current (g_CaS) was decreasedby 10%, which served to decrease the spiking frequency by removingsome of the background depolarization provided by this current(see Fig. 8D, top panel). The transient current (g_CaT) was decreasedby 66.6%. This change had the effect of turning the PD neuroninto a quiescent cell that spiked tonically with a small depolarizingcurrent injection (not shown). The roles of the intrinsic currentsin this case were very similar to those shown in Fig. 8D andthus are not shown. It is interesting to note that the PD modelneuron could be built and tuned (by changing g_CaT to 20.5 µSand g_proc to 35 µS from those shown in Table 2) to havea neuromodulatory current I_proc, as in the AB neuron, and yetproduce activity similar to that of the model PD neuron describedabove (not shown). In this case, the removal of I_proc from thePD neuron would have effects that are similar to those obtainedby decreasing the calcium currents (data not shown).

Figure 9 shows the currents in the S/N compartments of the modelAB and PD neurons when these 2 compartments were electricallycoupled, mimicking the gap junction in the biological network.The electrical coupling current allowed the PD neuron to produceslow, bursting oscillations in phase with the AB neuron. Inturn, the coupling current into the S/N compartment of the ABneuron affected the waveform of the AB neuron by diminishingits burst amplitude, lengthening both the burst and the silentphases and thereby increasing its period (see also Fig. 3B).The gap-junctional current in the AB neuron (Fig. 9, left column,third trace from top) was mostly hyperpolarizing during thesilent phase and also (at least on average) during the initialpart of the burst. This was consistent with the decrease inamplitude of the AB neuron burst, as well as the lengtheningof the silent phase. The lengthening of the AB neuron burstphase was mainly attributed to the depolarizing effect fromthe gap-junctional current later in the burst. The roles ofthe intrinsic currents of the coupled AB neuron (Fig. 9, leftcolumn) are very similar to those of the isolated AB neuron(Fig. 8B). The most noticeable difference between the intrinsiccurrents of the coupled PD neuron (Fig. 9, right column) andthose of its isolated S/N compartment (Fig. 8C) was that theleak current I_L in the case of the coupled PD is completelyhyperpolarizing because the S/N compartment oscillation wasabove its leak reversal potential. This difference, however,was not significant because, by decreasing the maximal conductanceof the leak current by 31%, the membrane potential oscillationin the coupled PD neuron also hyperpolarized below its leakreversal potential (not shown). In both the isolated S/N compartmentof the model PD and the coupled PD neurons, an increase of 24%in the maximal conductance of the leak current I_L had the effectof increasing the oscillation period; the increase was 27% inthe isolated S/N compartment of the PD neuron and 42% in thecoupled PD neuron (not shown). The amplitude of the oscillation,however, was basically not affected by a 24% increase in themaximal conductance of I_L in the case of the isolated S/N compartmentof the PD neuron, whereas it did decrease in the case of thecoupled PD neuron by 2 mV (not shown).

View larger version (22K):
[in this window]
[in a new window]

FIG. 9. Currents in the S/N compartments of the AB–PD pacemaker model network in the presence of modulatory inputs. Boxes show enlargements of 600 ms of activity.

	DISCUSSION

TOP ABSTRACT INTRODUCTION METHODS RESULTS DISCUSSION GRANTS REFERENCES

The common intuition on the role of gap junctions is that theysynchronize the activity of similar neurons. Several modelingand analytical studies have addressed the role that electricalcoupling plays in neuronal systems and these studies indicatea more complex role. For example, in networks of identical integrate-and-firespiking neurons, different activity patterns of the networksuch as synchronous, asynchronous, and phase-locked modes dependon the spike shape, amplitude, and frequency as well as thestrength of the coupling between the neurons (Chow and Kopell2000

). Electrical coupling can extend the parameter range overwhich initially uncoupled model neurons were able to burst (Komendantovet al. 2004

; Sherman and Rinzel 1992

). When heterogeneity isintroduced in diffusely coupled bursting neurons synchronousbehavior can be destabilized (De Vries et al. 1998

). However,the right combination of heterogeneous conductances with appropriatecoupling strengths in electrically coupled nonoscillator modelneurons can produce synchronous oscillatory behavior (Manoret al. 1997

Chains of strongly diffusively coupled oscillators, each witha distinct intrinsic frequency, can display very long transientsbefore reaching a stationary periodic state in which the frequencyis the mean of the individual oscillator frequencies (Medvedevet al. 2003; Wilson and Callaway 2000). Combinations of electricalcoupling and chemical synapses could produce yet more complexityin the network output. In a network of electrically coupledneurons that reciprocally inhibit each other, the generationand stabilization of bursting behavior was attributed to theelectrical coupling between them (Skinner et al. 1999).

In this study we set out to explore the consequences of electricalcoupling between 2 intrinsically distinct neurons. In particular,we focused on electrical coupling between a bursting neuronto a larger, tonic spiking neuron inspired by the pacemakernetwork of the lobster pyloric central pattern generator. Wedeveloped a 2-compartment per neuron network of the pacemakerand used the model to illustrate a variety of neuron and networkbehaviors arising from electrically coupling very differentoscillators.

The AB–PD model and the biological AB–PD pacemaker

We have built a model of the lobster pyloric pacemaker network,consisting of the strongly electrically coupled AB and PD neurons,in which the 2 neurons are modeled as separate cells, takinginto account their distinct intrinsic dynamics. Our model capturesthe qualitative dynamic behavior of the actual network: 1) Ithas a wide frequency range; 2) the burst amplitude decreaseswith increasing frequency; 3) as the frequency increases, thenumber of spikes per burst decrease; 4) there is a transitionto tonic spiking in which irregular small bursting and irregularspiking occurs; and 5) with sufficiently high depolarizing currentthe network produces tonic spiking. Although the evolution frombursting to tonic spiking is qualitatively similar to that ofthe biological network, our model shows higher sensitivity tohyperpolarizing than to depolarizing current injection comparedwith the biological neurons. This difference is probably attributableto the specific voltage dependency properties of the currentswe used. Our model does not include low-threshold regenerativeinward currents because no such current has yet been characterizedin the biological AB and PD neurons. The calcium currents havehalf-maximum potential values at somewhat depolarized values,whereas the calcium-dependent potassium currents are activatedat fairly hyperpolarized values. As more measurements of ioniccurrents from the biological AB and PD neurons become available,the model can be refined to reflect better the intrinsic propertiesof these pacemaker neurons.

Both neurons were modeled using the same intrinsic currents.The only major differences were the time constants for the inactivationof I_CaT and the steady-state activation slope of the calcium-dependentpotassium current I_KCa (see Table 1). These differences actedto prevent the model PD neuron from bursting in isolation byhaving a slower inactivation of I_CaT and a less-abrupt activationof I_KCa. Whether the biological AB and PD neurons express allof the same currents is not known. It is quite possible, however,that these 2 neurons express different ratios of calcium channeltypes (Johnson et al. 2003) and our modeling r