Deformation of the heat kernel and the Brownian motion from the perspective of the Ben Sa\"id--Kobayashi--rsted (k,a)-generalized Laguerre semigroup theory

Abstract

We deform the heat kernel and the Brownian motion on RN from the perspective of "(k,a)-generalized Fourier analysis" with k=0. This is a new type of harmonic analysis proposed by S.Ben Sa\"id--T.Kobayashi--B.rsted from the representation theoretic viewpoint. In this paper, we construct the a-deformed heat kernel and a-deformed Brownian motion, and explore their some basic properties. We also prove that the (k,a)-generalized Fourier integral kernels are polynomial growth when k=0, for a justification of some discussions.

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