Determine the source term of a two-dimensional heat equation

Abstract

Let be a two-dimensional heat conduction body. We consider the problem of determining the heat source F(x,t)=(t)f(x,y) with be given inexactly and f be unknown. The problem is nonlinear and ill-posed. By a specific form of Fourier transforms, we shall show that the heat source is determined uniquely by the minimum boundary condition and the temperature distribution in at the initial time t=0 and at the final time t=1. Using the methods of Tikhonov's regularization and truncated integration, we construct the regularized solutions. Numerical part is given.