Explicit solution of an inverse first-passage time problem for Lévy processes and counterparty credit risk

Abstract: For a given Markov process X and survival function H on R + , the inverse first-passage time problem (IFPT) is to find a barrier function b : +∞] such that the survival function of the first-passage time τ b = inf{t ≥ 0 : X(t) < b(t)} is given by H. In this paper, we consider a version of the IFPT problem where the barrier is fixed at zero and the problem is to find an initial distribution µ and a time-change I such that for the time-changed process X • I the IFPT problem is solved by a constant barrier at th… Show more

“…To our knowledge it has not be proven that a strong solution to the system (1.8) exists, nor that there is a smooth b solving the IFPT. A variation of the IFPT is studied in [4,5]. There the barrier is fixed at zero (i.e., b ≡ 0), and it is the volatility parameter σ(•, •), that is, allowed to vary.…”

Killed Brownian motion with a prescribed lifetime distribution and models of default

“…To our knowledge it has not be proven that a strong solution to the system (1.8) exists, nor that there is a smooth b solving the IFPT. A variation of the IFPT is studied in [4,5]. There the barrier is fixed at zero (i.e., b ≡ 0), and it is the volatility parameter σ(•, •), that is, allowed to vary.…”

Killed Brownian motion with a prescribed lifetime distribution and models of default

On the heat equation with a moving boundary and applications to hitting times for Brownian motion

In memoriam: Mark H. A. Davis and his contributions to mathematical finance