Nonlocal Fisher information: lifting, local limit, and the Blachman-Stam inequality
Abstract
We show that the nonlocal Fisher information - defined as the entropy dissipation of the Boltzmann entropy for nonlocal heat equations - admits a natural lifting in the sense of Guillen and Silvestre (2025). Important examples include the discrete Fisher information arising in Markov chains and the fractional Fisher information is associated with the fractional Laplacian (-)s on Rd, s∈ (0,1). We further establish a Blachman-Stam inequality (BSI) for the fractional Fisher information is, and prove that, for a large class of functions, is converges to the classical Fisher information as s 1. Through this nonlocal-to-local limit, we recover the classical BSI and the lifting property of the classical Fisher information.
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