Time-dependent weak rate of convergence for functions of generalized bounded variation

Abstract

Let W denote the Brownian motion. For any exponentially bounded Borel function g the function u defined by u(t,x)= E[g(x+σ WT-t)] is the stochastic solution of the backward heat equation with terminal condition g. Let un(t,x) denote the corresponding approximation generated by a simple symmetric random walk with time steps 2T/n and space steps σ T/n where σ > 0. For quite irregular terminal conditions g (bounded variation on compact intervals, locally H\"older continuous) the rate of convergence of un(t,x) to u(t,x) is considered, and also the behavior of the error un(t,x)-u(t,x) as t tends to T