English

Derivative Formula and Gradient Estimates for Gruschin Type Semigroups

Probability 2013-04-04 v4

Abstract

By solving a control problem and using Malliavin calculus, explicit derivative formula is derived for the semigroup PtP_t generated by the Gruschin type operator on Rm×Rd:\R^{m}\times \R^{d}: L(x,y)=\ff12{i=1m\ppxi2+j,k=1d(\si(x)\si(x))jk\ppyj\ppyk},  (x,y)Rm×Rd,L (x,y)=\ff 1 2 \bigg\{\sum_{i=1}^m \pp_{x_i}^2 +\sum_{j,k=1}^d (\si(x)\si(x)^*)_{jk} \pp_{y_j}\pp_{y_k}\bigg\},\ \ (x,y)\in \R^m\times\R^d, where \siC1(Rm;RdRd)\si\in C^1(\R^m; \R^d\otimes\R^d) might be degenerate. In particular, if \si(x)\si(x) is comparable with xlId×d|x|^{l}I_{d\times d} for some l1l\ge 1 in the sense of (\ref{A4}), then for any p>1p>1 there exists a constant Cp>0C_p>0 such that \nnPtf(x,y)\ffCp(Ptfp)1/p\sst\sst(x2+t)l,  t>0,f\Bb(Rm+d),(x,y)Rm+d,|\nn P_t f(x,y)|\le \ff{C_p (P_t |f|^p)^{1/p}}{\ss{t}\land \ss{t(|x|^2+t)^l}},\ \ t>0, f\in \B_b(\R^{m+d}), (x,y)\in \R^{m+d}, which implies a new Harnack type inequality for the semigroup. A more general model is also investigated.

Keywords

Cite

@article{arxiv.1109.6738,
  title  = {Derivative Formula and Gradient Estimates for Gruschin Type Semigroups},
  author = {Feng-Yu Wang},
  journal= {arXiv preprint arXiv:1109.6738},
  year   = {2013}
}

Comments

17 pages

R2 v1 2026-06-21T19:13:01.840Z