2012
DOI: 10.1152/jn.00919.2011
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Efficient estimation of phase-response curves via compressive sensing

Abstract: The phase-response curve (PRC), relating the phase shift of an oscillator to external perturbation, is an important tool to study neurons and their population behavior. It can be experimentally estimated by measuring the phase changes caused by probe stimuli. These stimuli, usually short pulses or continuous noise, have a much wider frequency spectrum than that of neuronal dynamics. This makes the experimental data high dimensional while the number of data samples tends to be small. Current PRC estimation meth… Show more

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Cited by 5 publications
(5 citation statements)
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“…We begin by considering a network composed of interacting oscillator elements. In biology, such systems include a network of circadian cells in the suprachiasmatic nucleus [56], brain network composed of many spiking neurons [43,46], cardiac muscle cells in the heart [57], etc. In terms of nonlinear dynamics, such systems are described as a system of N coupled limit cycle oscillators:…”
Section: (B) Problem and Methodsmentioning
confidence: 99%
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“…We begin by considering a network composed of interacting oscillator elements. In biology, such systems include a network of circadian cells in the suprachiasmatic nucleus [56], brain network composed of many spiking neurons [43,46], cardiac muscle cells in the heart [57], etc. In terms of nonlinear dynamics, such systems are described as a system of N coupled limit cycle oscillators:…”
Section: (B) Problem and Methodsmentioning
confidence: 99%
“…The phase sensitivity function Z(θ) plays a vital role in the studies of coupled oscillators, since it describes one of the most fundamental properties of the oscillator element [58][59][60]. Numerous approaches have been proposed to estimate the phase sensitivity function from experimental data [43][44][45][46][47][48][49][50][51][52]. As an extension of our technique, the phase sensitivity function can be recovered from the coupling function [79].…”
Section: (A) Inferring Phase Sensitivity Functionmentioning
confidence: 99%
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