Crossing Probabilities for Diffusion Processes with Piecewise Continuous Boundaries

We evaluate some boundary-crossing time density functions for time-changed Brownian motion. As examples, we evaluate the ÿrst passage time densities of Ornstein-Uhlenbeck process to exponential boundaries and Brownian bridge to two linearly shrinking boundaries. We also evaluate explicitly the ÿrst

Atmtract~We give sharp error estimates for both function and derivative when the coefficients and right hand side of a given initial or boundary value problem for ordinary differential equations are replaced by local appro3dmations. These estimates are given for partition points and also contlnuousl

In this paper, the semi-continuous random process with reflecting and delaying screens which plays an important role in stock control theory is constructed. Furthermore, the distribution function, its Laplace transform and numerical characteristics of the boundary functional of the process where is

The continuous interior penalty (CIP) method for elliptic convection-diffusion problems with characteristic layers on a Shishkin mesh is analysed. The method penalises jumps of the normal derivative across interior edges. We show that it is of the same order of convergence as the streamline diffusio