Litcius/Paper detail

Macroscopic behavior of populations of quadratic integrate-and-fire neurons subject to non-Gaussian white noise

Denis S. Goldobin, Evelina V. Permyakova, Lyudmila S. Klimenko

2024Chaos An Interdisciplinary Journal of Nonlinear Science14 citationsDOIOpen Access PDF

Abstract

We study macroscopic behavior of populations of quadratic integrate-and-fire neurons subject to non-Gaussian noises; we argue that these noises must be α-stable whenever they are delta-correlated (white). For the case of additive-in-voltage noise, we derive the governing equation of the dynamics of the characteristic function of the membrane voltage distribution and construct a linear-in-noise perturbation theory. Specifically for the recurrent network with global synaptic coupling, we theoretically calculate the observables: population-mean membrane voltage and firing rate. The theoretical results are underpinned by the results of numerical simulation for homogeneous and heterogeneous populations. The possibility of the generalization of the pseudocumulant approach to the case of a fractional α is examined for both irrational and fractional rational α. This examination seemingly suggests the pseudocumulant approach or its modifications to be employable only for the integer values of α=1 (Cauchy noise) and 2 (Gaussian noise) within the physically meaningful range (0;2]. Remarkably, the analysis for fractional α indirectly revealed that, for the Gaussian noise, the minimal asymptotically rigorous model reduction must involve three pseudocumulants and the two-pseudocumulant model reduction is an artificial approximation. This explains a surprising gain of accuracy for the three-pseudocumulant models as compared to the two-pseudocumulant ones reported in the literature.

Topics & Concepts

White noiseGaussianGaussian noiseStatistical physicsQuadratic equationNoise (video)MathematicsObservableAdditive white Gaussian noisePopulationApplied mathematicsPhysicsComputer scienceAlgorithmStatisticsQuantum mechanicsArtificial intelligenceImage (mathematics)DemographyGeometrySociologystochastic dynamics and bifurcationNeural dynamics and brain functionNonlinear Dynamics and Pattern Formation