Modelling with measures: Approximation of a mass-emitting object by a point source

Abstract

We consider a linear diffusion equation on :=R2O, where O is a bounded domain. The time-dependent flux on the boundary :=∂O is prescribed. The aim of the paper is to approximate the dynamics by the solution of the diffusion equation on the whole of R2 with a measure-valued point source in the origin and provide estimates for the quality of approximation. For all time t, we derive an L2([0,t];L2())-bound on the difference in flux on the boundary. Moreover, we derive for all t>0 an L2()-bound and an L2([0,t];H1())-bound for the difference of the solutions to the two models.