<p>We introduce a framework for stochastic differential equations (SDEs) with interaction on compact, connected, <i>d</i>-dimensional manifolds. For SDEs whose drift and diffusion coefficients may depend on both the state variable and the empirical distribution, we establish existence and uniqueness of strong solutions under general regularity assumptions. We study the associated measure-valued process on the Wasserstein space over the manifold, deriving an explicit Itô–Wiener decomposition. We prove Malliavin differentiability of the solution and, using directional derivatives in the Wasserstein space, establish smooth dependence of the solution on the measure component for a class of coefficients.</p>

错误:搜索内容不能为空,请输入英文关键词
错误:关键词超出字数限制,请精简
高级检索

Krylov–Veretennikov Decomposition for Measure-Valued Processes Induced by Stochastic Differential Equations with Interaction on Riemannian Manifolds

  • Andrey Dorogovtsev,
  • Alexander Weiß

摘要

We introduce a framework for stochastic differential equations (SDEs) with interaction on compact, connected, d-dimensional manifolds. For SDEs whose drift and diffusion coefficients may depend on both the state variable and the empirical distribution, we establish existence and uniqueness of strong solutions under general regularity assumptions. We study the associated measure-valued process on the Wasserstein space over the manifold, deriving an explicit Itô–Wiener decomposition. We prove Malliavin differentiability of the solution and, using directional derivatives in the Wasserstein space, establish smooth dependence of the solution on the measure component for a class of coefficients.