English

It\^{o}-Stratonovich Conversion in Infinite Dimensions for Unbounded, Time-Dependent, Nonlinear Operators

Probability 2025-08-06 v1 Analysis of PDEs

Abstract

We prove that a solution, in a variational framework, to the Stratonovich stochastic partial differential equation with noise G(t,Ψt)dWtG\left(t, \Psi_t\right) \circ dW_t is given by a solution to the It\^{o} equation with It\^{o}-Stratonovich corrector 12i=1DuGi(t,Ψt)[Gi(t,Ψt)]dt\frac{1}{2}\sum_{i=1}^\infty D_uG_i\left(t, \Psi_t\right)\left[G_i(t,\Psi_t)\right]dt. Here GiG_i denotes the action of GG on the ithi^{th} component of the cylindrical noise, and DuGiD_uG_i its Fr\'{e}chet partial derivative in the Hilbert space for which the It\^{o} form is satisfied. The noise operator GG may be time-dependent, nonlinear, and unbounded in the sense of differential operators; in the latter case, one must pass to a larger space in order to solve the Stratonovich equation. Our proof relies on martingale techniques, and the results apply to fluid equations with time-dependent and nonlinear transport noise.

Keywords

Cite

@article{arxiv.2508.03424,
  title  = {It\^{o}-Stratonovich Conversion in Infinite Dimensions for Unbounded, Time-Dependent, Nonlinear Operators},
  author = {Daniel Goodair},
  journal= {arXiv preprint arXiv:2508.03424},
  year   = {2025}
}
R2 v1 2026-07-01T04:35:08.445Z