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Anomalous Lifshitz dimension in hierarchical networks of brain connectivity

Published 22 Jul 2020 in cond-mat.dis-nn and cond-mat.stat-mech | (2007.11337v2)

Abstract: The spectral dimension is a generalization of the Euclidean dimension and quantifies the propensity of a network to transmit and diffuse information. We show that, in hierarchical-modular network models of the brain, dynamics are anomalously slow and the spectral dimension is not defined. Inspired by Anderson localization in quantum systems, we relate the localization of neural activity - essential to embed brain functionality - to the network spectrum and to the existence of an anomalous "Lifshitz dimension". In a broader context, our results help shedding light on the relationship between structure and function in biological information-processing complex networks.

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