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Decomposing the Local Arrow of Time in Interacting Systems

Author(s): Lynn, Christopher W; Holmes, Caroline M; Bialek, William; Schwab, David J

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Abstract: We show that the evidence for a local arrow of time, which is equivalent to the entropy production in thermodynamic systems, can be decomposed. In a system with many degrees of freedom, there is a term that arises from the irreversible dynamics of the individual variables, and then a series of non– negative terms contributed by correlations among pairs, triplets, and higher–order combinations of variables. We illustrate this decomposition on simple models of noisy logical computations, and then apply it to the analysis of patterns of neural activity in the retina as it responds to complex dynamic visual scenes. We find that neural activity breaks detailed balance even when the visual inputs do not, and that this irreversibility arises primarily from interactions between pairs of neurons.
Publication Date: 6-Sep-2022
Electronic Publication Date: 6-Sep-2022
Citation: Lynn, Christopher W, Holmes, Caroline M, Bialek, William, Schwab, David J. (Decomposing the Local Arrow of Time in Interacting Systems. Physical Review Letters, 129 (11), 10.1103/physrevlett.129.118101
DOI: doi:10.1103/physrevlett.129.118101
ISSN: 0031-9007
EISSN: 1079-7114
Language: en
Type of Material: Journal Article
Journal/Proceeding Title: Physical Review Letters
Version: Author's manuscript



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