English

Viscosity methods giving uniqueness for martingale problems

Probability 2015-11-19 v2

Abstract

Let EE be a complete, separable metric space and AA be an operator on Cb(E)C_b(E). We give an abstract definition of viscosity sub/supersolution of the resolvent equation λuAu=h\lambda u-Au=h and show that, if the comparison principle holds, then the martingale problem for AA has a unique solution. Our proofs work also under two alternative definitions of viscosity sub/supersolution which might be useful, in particular, in infinite dimensional spaces, for instance to study measure-valued processes. We prove the analogous result for stochastic processes that must satisfy boundary conditions, modeled as solutions of constrained martingale problems. In the case of reflecting diffusions in DRdD\subset {\bf R}^d, our assumptions allow D D to be nonsmooth and the direction of reflection to be degenerate. Two examples are presented: A diffusion with degenerate oblique direction of reflection and a class of jump diffusion processes with infinite variation jump component and possibly degenerate diffusion matrix.

Keywords

Cite

@article{arxiv.1406.6650,
  title  = {Viscosity methods giving uniqueness for martingale problems},
  author = {Cristina Costantini and Thomas G. Kurtz},
  journal= {arXiv preprint arXiv:1406.6650},
  year   = {2015}
}
R2 v1 2026-06-22T04:47:11.735Z