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Reduction Methodology for Fluctuation Driven Population Dynamics

Denis S. Goldobin, Matteo di Volo, Alessandro Torcini

2021Physical Review Letters58 citationsDOIOpen Access PDF

Abstract

Lorentzian distributions have been largely employed in statistical mechanics to obtain exact results for heterogeneous systems. Analytic continuation of these results is impossible even for slightly deformed Lorentzian distributions due to the divergence of all the moments (cumulants). We have solved this problem by introducing a "pseudocumulants" expansion. This allows us to develop a reduction methodology for heterogeneous spiking neural networks subject to extrinsic and endogenous fluctuations, thus obtaining a unified mean-field formulation encompassing quenched and dynamical sources of disorder.

Topics & Concepts

CumulantDivergence (linguistics)Statistical physicsReduction (mathematics)ContinuationAnalytic continuationApplied mathematicsNoise (video)PhysicsStatistical mechanicsMathematicsComputer scienceMathematical analysisStatisticsArtificial intelligenceImage (mathematics)Programming languageLinguisticsGeometryPhilosophyNeural dynamics and brain functionstochastic dynamics and bifurcationNonlinear Dynamics and Pattern Formation
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