Parameter dependent rough SDEs with applications to rough PDEs

Fabio Bugini, Peter K. Friz, Wilhelm Stannat
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Abstract

In this paper we generalize Krylov's theory on parameter-dependent stochastic differential equations to the framework of rough stochastic differential equations (rough SDEs), as initially introduced by Friz, Hocquet and L\^e. We consider a stochastic equation of the form $$ dX_t^\zeta = b_t(\zeta,X_t^\zeta) \ dt + \sigma_t(\zeta,X_t^\zeta) \ dB_t + \beta_t (\zeta,X_t^\zeta) d\mathbf{W}_t,$$ where $\zeta$ is a parameter, $B$ denotes a Brownian motion and $\mathbf{W}$ is a deterministic H\"older rough path. We investigate the conditions under which the solution $X$ exhibits continuity and/or differentiability with respect to the parameter $\zeta$ in the $\mathscr{L}$-sense, as defined by Krylov. As an application, we present an existence-and-uniqueness result for a class of rough partial differential equations (rough PDEs) of the form $$-du_t = L_t u_t dt + \Gamma_t u_t d\mathbf{W}_t, \quad u_T =g.$$ We show that the solution admits a Feynman--Kac type representation in terms of the solution of an appropriate rough SDE, where the initial time and the initial state play the role of parameters.
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参数相关粗糙 SDEs 及其在粗糙 PDEs 中的应用
在本文中,我们将克雷洛夫关于依赖参数的随机微分方程的理论推广到粗糙随机微分方程(粗糙 SDEs)的框架中,粗糙 SDEs 最初是由 Friz、Hocquet 和 L\^e 提出的。我们考虑一个形式为 $$ dX_t^\zeta = b_t(\zeta,X_t^\zeta)\ dt + \sigma_t(\zeta,X_t^\zeta) \ dB_t + \beta_t (\zeta. X_t^\zeta)\ dt 的随机方程、X_t^\zeta)d\mathbf{W}_t, $$ 其中 $\zeta$ 是一个参数,$B$ 表示布朗运动,$\mathbf{W}$ 是一个确定的 H\"older rough path。我们研究了在克雷洛夫定义的$mathscr{L}$意义上,解$X$相对于参数$\zeta$表现出连续性和/或无差异的条件。作为应用,我们提出了一类形式为 $$-du_t = L_tu_t dt + \Gamma_t u_t d\mathbf{W}_t, \quad u_T =g.$$ 的粗糙偏微分方程(粗糙 PDEs)的存在性和唯一性结果。
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