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

Abstract

The inverse first passage time problem asks whether, for a Brownian motion B and a nonnegative random variable ζ, there exists a time-varying barrier b such that P\Bs>b(s),0≤ s≤ t\=P\ζ>t\. We study a "smoothed" version of this problem and ask whether there is a "barrier" b such that E[(-λ∫0t(Bs-b(s))\,ds)]=P\ζ >t\, where λ is a killing rate parameter, and :R[0,1] is a nonincreasing function. We prove that if is suitably smooth, the function t P\ζ>t\ is twice continuously differentiable, and the condition 0<-d\ζ>t\dt<λ holds for the hazard rate of ζ, then there exists a unique continuously differentiable function b solving the smoothed problem. We show how this result leads to flexible models of default for which it is possible to compute expected values of contingent claims.