Causal diffusion and its backwards diffusion problem

Abstract

This article starts over the backwards diffusion problem by replacing the noncausal diffusion equation, the direct problem, by the causal diffusion model developed in Kow11 for the case of constant diffusion speed. For this purpose we derive an analytic representation of the Green function of causal diffusion in the wave vector-time space for arbitrary (wave vector) dimension N. We prove that the respective backwards diffusion problem is ill-posed, but not exponentially ill-posed, if the data acquisition time is larger than a characteristic time period τ (2\,τ) for space dimension N≥ 3 (N=2). In contrast to the noncausal case, the inverse problem is well-posed for N=1. Moreover, we perform a theoretical and numerical comparison between causal and noncausal diffusion in the space-time domain and the wave vector-time domain. The paper is concluded with numerical simulations of the backwards diffusion problem via the Landweber method.