English

Gradient estimates for SDEs without monotonicity type conditions

Probability 2018-09-25 v1 Analysis of PDEs

Abstract

We prove gradient estimates for transition Markov semigroups (Pt)(P_t) associated to SDEs driven by multiplicative Brownian noise having possibly unbounded C1C^1-coefficients, without requiring any monotonicity type condition. In particular, first derivatives of coefficients can grow polynomially and even exponentially. We establish pointwise estimates with weights for DxPtφD_x P_t\varphi of the form tDxPtφ(x)c(1+xk)φ {\sqrt{t}} \, |D_x P_t \varphi (x) | \le c \, (1+ |x|^k) \, \| \varphi\|_{\infty} t(0,1]t \in (0,1], φCb(Rd)\varphi \in C_b ({\mathbb R}^d), xRd.x \in {\mathbb R}^d. To prove the result we use two main tools. First, we consider a Feynman--Kac semigroup with potential VV related to the growth of the coefficients and of their derivatives for which we can use a Bismut-Elworthy-Li type formula. Second, we introduce a new regular approximation for the coefficients of the SDE. At the end of the paper we provide an example of SDE with additive noise and drift bb having sublinear growth together with its derivative such that uniform estimates for DxPtφD_x P_t \varphi without weights do not hold.

Keywords

Cite

@article{arxiv.1803.03846,
  title  = {Gradient estimates for SDEs without monotonicity type conditions},
  author = {Giuseppe Da Prato and Enrico Priola},
  journal= {arXiv preprint arXiv:1803.03846},
  year   = {2018}
}
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