A Two Dimensional Backward Heat Problem With Statistical Discrete Data

Abstract

In this paper, we focus on the backward heat problem of finding the function θ(x,y)=u(x,y,0) such that \[ l l l ut - a(t)(uxx + uyy) & = f(x,y,t), & (x,y,t) ∈ × (0,T), u(x,y,T) & = h(x,y), & (x,y) ∈. \] where = (0,π) × (0,π) and the heat transfer coefficient a(t) is known. In our problem, the source f = f(x,y,t) and the final data h(x,y) are unknown. We only know random noise data gij(t) and dij satisfying the regression models gij(t) &=& f(xi,yj,t) + ij(t), dij &=& h(xi,yj) + σijεij, where ij(t) are Brownian motions, εij N(0,1), (xi,yj) are grid points of and σij, are unknown positive constants. The noises ij(t), εij are mutually independent. From the known data gij(t) and dij, we can recovery the initial temperature θ(x,y). However, the result thus obtained is not stable and the problem is severely ill--posed. To regularize the instable solution, we use the trigonometric method in nonparametric regression associated with the truncated expansion method. In addition, convergence rate is also investigated numerically.