arXiv:math/0310262 Abstract

arXiv:math/0310262 [math.PR]Abstract References Reviews Resources

Probabilistic representations of solutions to the heat equation

Published 2003-10-17Version 1

In this paper we provide a new (probabilistic) proof of a classical result in partial differential equations, viz. if $\phi$ is a tempered distribution, then the solution of the heat equation for the Laplacian, with initial condition $\phi$, is given by the convolution of $\phi$ with the heat kernel (Gaussian density). Our results also extend the probabilistic representation of solutions of the heat equation to initial conditions that are arbitrary tempered distributions.

Comments: 12 pages

Journal: Proc. Indian Acad. Sci. (Math. Sci.), Vol. 113, No. 3, August 2003, pp. 321-332

Categories: math.PR, math.AP

Keywords: heat equation, probabilistic representation, initial condition, partial differential equations, arbitrary tempered distributions

Tags: journal article

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