On Malliavin differentiability and absolute continuity of one-dimensional doubly perturbed diffusion processes
Abstract
In this paper, we establish Malliavin differentiability and absolute continuity for α, β-doubly perturbed diffusion process with parameters α <1 and β <1 such that || < 1, where : = αβ(1-α)(1-β). Furthermore, under some regularity conditions on the coefficients, we prove that the solution Xt has a smooth density for all t∈(0, t0) for some finite number t0>0. Our results recover earlier works by Yue and Zhang (2015) and Xue, Yue and Zhang (2016), and the proofs are based on the techniques of the Malliavin calculus.
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