The Cauchy problem for the Finsler heat equation
Abstract
Let H be a norm of RN and H0 the dual norm of H. Denote by H the Finsler-Laplace operator defined by Hu:=div\,(H(∇ u)∇ H(∇ u)). In this paper we prove that the Finsler-Laplace operator H acts as a linear operator to H0-radially symmetric smooth functions. Furthermore, we obtain an optimal sufficient condition for the existence of the solution to the Cauchy problem for the Finsler heat equation ∂t u=H u, x∈ RN, t>0, where N 1 and ∂t:=∂/∂ t.
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