English

Stability in quadratic variation, with applications

Probability 2024-05-09 v8

Abstract

We show that non continuous Dirichlet processes, defined as in \cite{NonCont} are closed under a wide family of locally Lipschitz continuous maps (similar to the time-homogeneous variants of the maps considered in \cite{Low}) thus extending Theorem 2.1. from that paper. We provide an It\^o formula for these transforms and apply it to study of how [f(Xn)f(X)]0[f(X^n)-f(X)]\to 0 when XnXX^n\to X (in some appropriate sense) for certain Dirichlet processes {Xn}n\{X^n\}_n, XX and certain locally Lipschitz continuous maps. We also consider how [fn(Xn)f(X)]0[f_n(X^n)-f(X)]\to 0 for C1C^1 maps {fn}n\{f_n\}_n, ff when fnff_n'\to f' uniformly on compacts. For applications we give examples of jump removal and stability of integrators.

Keywords

Cite

@article{arxiv.2011.14151,
  title  = {Stability in quadratic variation, with applications},
  author = {Philip Kennerberg and Magnus Wiktorsson},
  journal= {arXiv preprint arXiv:2011.14151},
  year   = {2024}
}

Comments

This article has been heavily revised with a different focus. I plan to upload the new article instead of this one

R2 v1 2026-06-23T20:34:13.166Z