On The Distribution Tail Of Stochastic Differential Equations: The One-Dimensional Case

Abstract

This paper considers a general one-dimensional stochastic differential equation (SDE). A particular attention is given to the SDEs that may be transformed (via Ito's formula) into:d X\t = ( B (X\t) - b X\t) d t + X\t d W\t, ~~~X\0 > 0,where B(y)/ y 0. It is shown that the MGF of X\t explodes at a critical moment μ\t which is independent of B. Furthermore, this MGF is given as a sum of the MGF of a Cox-Ingersoll-Ross process plus an extra term which is given by a nonlinear partial differential equation (PDE) on ∂\t and ∂\x. The existence and the uniqueness of the solution of the nonlinear PDE is then proved using the inverse function theorem in a Banach space that will be defined in the paper. As an application, the mean reverting equation d V\t = ( a - b V\t) d t + σ Vp\t d W\t, ~~~V\0 = v\0 > 0,is extensively studied where some sharp asymptotic expansions of its MGF as well as its complementary cumulative distribution (CCDF) are derived.