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A scale-dependent measure of system dimensionality

Stefano Recanatesi, Serena Bradde, Vijay Balasubramanian, Nicholas A. Steinmetz, Eric Shea‐Brown

2022Patterns31 citationsDOIOpen Access PDF

Abstract

A fundamental problem in science is uncovering the effective number of degrees of freedom in a complex system: its dimensionality. A system's dimensionality depends on its spatiotemporal scale. Here, we introduce a scale-dependent generalization of a classic enumeration of latent variables, the participation ratio. We demonstrate how the scale-dependent participation ratio identifies the appropriate dimension at local, intermediate, and global scales in several systems such as the Lorenz attractor, hidden Markov models, and switching linear dynamical systems. We show analytically how, at different limiting scales, the scale-dependent participation ratio relates to well-established measures of dimensionality. This measure applied in neural population recordings across multiple brain areas and brain states shows fundamental trends in the dimensionality of neural activity-for example, in behaviorally engaged versus spontaneous states. Our novel method unifies widely used measures of dimensionality and applies broadly to multivariate data across several fields of science.

Topics & Concepts

Curse of dimensionalityMeasure (data warehouse)AttractorScale (ratio)GeneralizationDimension (graph theory)PopulationDegrees of freedom (physics and chemistry)Markov chainDimensionality reductionMathematicsDynamical systems theoryLorenz systemComputer scienceArtificial intelligenceStatistical physicsStatisticsPhysicsData miningQuantum mechanicsDemographyMathematical analysisPure mathematicsSociologyNeural dynamics and brain functionstochastic dynamics and bifurcationNeural Networks and Applications
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