Nonlocal diffusion equations in Carnot Groups
Abstract
Let G be a Carnot group. We study nonlocal diffusion equations in a domain of G of the form utε(x,t)=∫G1ε2Kε(x,y)(uε(y,t)-uε(x,t))\,dy, x∈ with uε=g(x,t) for x. For appropriate rescaled kernel Kε we prove that solutions uε, when ε→0, uniformly approximate the solution of different local Dirichlet problem in G. The key tool used is the Taylor series development for a function defined on a Carnot group.
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