Some results on the Brownian meander with drift

Abstract

In this paper we study the drifted Brownian meander, that is a Brownian motion starting from u and subject to the condition that 0≤ z ≤ t B(z)> v with u > v . The limiting process for u v is analyzed and the sufficient conditions for its construction are given. We also study the distribution of the maximum of the meander with drift and the related first-passage times. The representation of the meander endowed with a drift is provided and extends the well-known result of the driftless case. The last part concerns the drifted excursion process the distribution of which coincides with the driftless case.