Higher-Order Regularity of the Free Boundary in the Inverse First-Passage Problem

Abstract

Consider the inverse first-passage problem: Given a diffusion process \Xt\t≥slant 0 on a probability space (,F,P) and a survival probability function p on [0,∞), find a boundary, x=b(t), such that p is the survival probability that X does not fall below b, i.e., for each t≥slant 0, p(t)= P(\ω∈\;|\; Xs(ω) ≥slant b(s),\ ∀\, s∈(0,t)\). In earlier work, we analyzed viscosity solutions of a related variational inequality, and showed that they provided the only upper semi-continuous (usc) solutions of the inverse problem. We furthermore proved weak regularity (continuity) of the boundary b under additional assumptions on p. The purpose of this paper is to study higher-order regularity properties of the solution of the inverse first-passage problem. In particular, we show that when p is smooth and has negative slope, the viscosity solution, and therefore also the unique usc solution of the inverse problem, is smooth. Consequently, the viscosity solution furnishes a unique classical solution to the free boundary problem associated with the inverse first-passage problem.

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