A new regularisation for time-fractional backward heat conduction problem

Abstract

It is well-known that the backward heat conduction problem of recovering the temperature u(·, t) at a time t≥ 0 from the knowledge of the temperature at a later time, namely g:= u(·, τ) for τ>t, is ill-posed, in the sense that small error in g can lead to large deviation in u(·, t). However, in the case of a time fractional backward heat conduction problem (TFBHCP), the above problem is well-posed for t>0 and ill-posed for t=0. We use this observation to obtain stable approximate solutions for the TFBHCP for t=0, and derive error estimates under suitable source conditions. We shall also provide some numerical examples to illustrate the approximation properties of the regularized solutions.