Exact Solutions of Nonlocal Boundary Value Problems for One- and Two-Dimensional Heat Equation

Abstract

It is proposed an operational method for obtaining of explicit solutions of space-nonlocal BVPs for the two-dimensional heat equation. It is based on a direct three-dimensional operational calculus built on a three-dimensional convolution, combining the classical Duhamel convolution with two non-classical convolutions for the operators ∂xx and ∂yy. The corresponding operational calculus uses multiplier fractions instead of convolution fractions. Extensions of the Duhamel principle to the space variables are given. *2000 Mathematics Subject Classification: 44A35, 35L20, 35J05, 35J25.