John Rinzel
Biophysical Mechanisms and Theoretical Foundations of Neural Computations
Generally, I am interested in the biophysical mechanisms and theoretical
foundations of dynamic neural computation. With a background in
engineering (BS: Univ of Florida, 1967) and applied mathematics (PhD:
Courant Institute, NYU, 1973) I use mathematical models to understand
how neurons and neural circuits generate and communicate with electrical
and chemical signals for physiological function. I especially relish
developing reduced, but biophysically-based, models that capture a neural
system's essence. Before joining the CNS faculty (and jointly that of
NYU's Courant Institute of Mathematical Sciences) in 1997, I was in the
Mathematical Research Branch at the NIH for nearly 25 years.
My research in computational neuroscience began in 1969 while I worked
for two years at the NIH with Wilfrid Rall to describe analytically the
voltage spread throughout a neuron's (passive) dendrites. We also showed
then that dendritic spines, based on their electrical properties, could
be loci for synaptic plasticity. Recently, my collaborators and I have
been studying the effects of active properties in dendritic membrane.
In several case studies (of bursting in hippocampal neurons, of bistable
firing in motoneurons, and of NMDA-induced bursting in dopamine neurons)
we have learned that some neurons' rich repertoire of firing behavior
depends critically upon the nonuniform spatial distribution of different
voltage-gated ionic channel types across the soma and dendritic membrane.
With a minimalist approach based on using only a few spatial/electrical
compartments we could dissect and reveal the essential effects of cable
properties and of spatially segregating some channel types.
Many of my modeling projects have dealt with oscillatory activity of
neurons and some secretory cells. We have developed methods, from the
mathematical theory of dynamical systems, to formulate and understand
intrinsic mechanisms for repetitive firing and bursting oscillations
of indivdual cells. Since 1992 we have also been investigating how
intercellular coupling mechanisms in conjunction with intrinsic properties
account for the experimentally observed collective rhythms of neurons
in networks (thalamus, hippocampus, inferior olive).
For example, in formulating and analyzing minimal biophysical models of sleep-spindle-like rhythms
in thalamic networks we concluded that mutual inhibition can lead
to in-phase synchrony when synaptic conductance decays slowly; although
counterintuitive, this effect appears to be quite general.
Our on-going studies of neuronal oscillations include: effects of electrical and synaptic coupling and correlated input on synchrony in mutually inhibitory sub-populations; synaptic depression and other mechanisms for spontaneous rhythmogenesis in developing neural systems; mechanisms for alternations in neuronal competition models of perceptual bistability, such as binocular rivalry.
In several current projects we have been studying the dynamics of auditory processing: the cellular and synaptic biophysical mechanisms for coincidence detection and precise temporal processing in brain stem neurons; adaptation mechanisms and dynamic plasticity in inferior colliculus and cortex.
Our research involves sustained and strong interactions with experimental groups here in the Center for Neural Science and elsewhere; frequently, members of my working group combine theoretical and experimental approaches.
E-mail: rinzel@cns.nyu.edu
Representative Publications
Rinzel J, Rall W: Transient response in a dendritic neuron
model for current injected at one branch. Biophysical
14:759-790, 1974.
Guttman R, Lewis S, Rinzel J: Control of repetitive firing in
squid axon membrane as a model for a neuron oscillator. J
Physiol (Lond) 305:377-395, 1980.
Wang X-J, Rinzel J: Alternating and synchronous rhythms in reciprocally
inhibitory model neurons. Neural Computation 4:84-97, 1992.
Pinsky PF, Rinzel J: Intrinsic and network rhythmogenesis in a reduced Traub
model for CA3 neurons. J Comput Neurosci 1:39-60, 1994.
Golomb D, Wang X-J, Rinzel J: Propagation of spindle waves in a thalamic
slice model, J Neurophysiol 75:750-769, 1996.
Rinzel J, Terman D, Wang X-J, Ermentrout B: Propagating activity patterns
in large-scale inhibitory neuronal networks, Science 279:1351-1355,
1998.
Agmon-Snir H, Carr CE, Rinzel J: A case study for dendritic function:
improving the performance of auditory coincidence detectors, Nature
393:268-272, 1998.
Smith GD, Cox DL, Sherman SM, Rinzel J: Fourier analysis of sinusoidally driven thalamocortical relay neurons and a minimal integrate-and-fire-or-burst model. J Neurophysiol 83:588-610, 2000.
Borisyuk A,Semple M, J Rinzel: Adaptation and inhibition underlie responses to time-varying interaural phase cues in a model of inferior colliculus neurons, J Neurophysiol 88: 2134-2146, 2002.
Lewis TJ, Rinzel J: Dynamics of spiking neurons connected by both inhibitory and electrical coupling. J Comput Neurosci 14:283-309, 2003.
Bem T, Rinzel J. Short duty cycle destabilizes a half-center oscillator, but gap junctions can restablize the anti-phase pattern. J Neurophys 91:693-703, 2004.
Svirskis G, Kotak V, Sanes D, Rinzel J. Sodium along with low threshold potassium currents enhance coincidence detection of subthreshold noisy signals in MSO neurons. J Neurophys 91:2465-2473, 2004.
Marchetti C, Tabak J, Chub N, O’Donovan MJ, Rinzel J. Modeling spontaneous activity in the developing spinal cord using activity-dependent variations of intracellular chloride. J Neurosci 25:3601-3612, 2005.
Additional publications (PubMed)
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