Degenerate SDE with Hölder-Dini Drift and Non-Lipschitz Noise Coefficient

The existence-uniqueness and stability of strong solutions are proved for a class of degenerate stochastic differential equations, where the noise coefficient might be non-Lipschitz, and the drift is locally Dini continuous in the component with noise (i.e., the second component) and locally Holder--Dini continuous of order $\frac{2}{3}$ in the first component. Moreover, the weak uniqueness is proved under weaker conditions on the noise coefficient. Furthermore, if the noise coefficient is $C^{1+\varepsilon}$ for some ${\varepsilon}>0$ and the drift is Holder continuous of order ${\alpha}{\in} (\frac{2}{3},1)$ in the first component and order ${\beta\in}(0,1) $ in the second, the solution forms a $C^1$-stochastic diffeormorphism flow. To prove these results, we present some new characterizations of Holder--Dini space by using the heat semigroup and slowly varying functions.

[1]  Michael Röckner,et al.  Strong solutions of stochastic equations with singular time dependent drift , 2005 .

[2]  A. Guillin,et al.  Degenerate Fokker–Planck equations: Bismut formula, gradient estimate and Harnack inequality , 2011, 1103.2817.

[3]  Chenggui Yuan,et al.  Harnack inequalities for stochastic (functional) differential equations with non-Lipschitzian coefficients , 2012 .

[4]  F. Flandoli,et al.  Strong Uniqueness for Stochastic Evolution Equations with Unbounded Measurable Drift Term , 2013 .

[5]  Feng-Yu Wang,et al.  Gradient estimates for SDEs driven by multiplicative Lévy noise , 2013, 1301.4528.

[6]  F. Flandoli,et al.  Strong uniqueness for SDEs in Hilbert spaces with nonregular drift , 2014, 1404.5418.

[7]  Renming Song,et al.  Stochastic flows for Lévy processes with Hölder drifts , 2015, Revista Matemática Iberoamericana.

[8]  S. Menozzi Parametrix techniques and martingale problems for some degenerate Kolmogorov equations , 2010, 1011.1824.

[9]  Xicheng Zhang,et al.  Stochastic flows and Bismut formulas for stochastic Hamiltonian systems , 2010 .

[10]  S. Mehler Stochastic Flows And Stochastic Differential Equations , 2016 .

[11]  Xicheng Zhang Stochastic functional differential equations driven by Lévy processes and quasi-linear partial integro-differential equations. , 2011, 1106.3601.

[12]  Feng-Yu Wang,et al.  Degenerate SDEs in Hilbert Spaces with Rough Drifts , 2015, 1501.04150.

[13]  Shinzo Watanabe,et al.  On the uniqueness of solutions of stochastic difierential equations , 1971 .

[14]  Xicheng Zhang,et al.  Stochastic Volterra Equations in Banach Spaces and Stochastic Partial Differential Equations , 2008, 0812.0834.

[15]  J. Cooper SINGULAR INTEGRALS AND DIFFERENTIABILITY PROPERTIES OF FUNCTIONS , 1973 .

[16]  E. Fedrizzi,et al.  Pathwise uniqueness and continuous dependence for SDEs with non-regular drift , 2010, 1004.3485.

[17]  A. Veretennikov On the Strong Solutions of Stochastic Differential Equations , 1980 .

[18]  Franco Flandoli,et al.  Pathwise uniqueness for a class of SDE in Hilbert spaces and applications , 2010 .

[19]  Tusheng Zhang,et al.  A study of a class of stochastic differential equations with non-Lipschitzian coefficients , 2005 .

[20]  F. Flandoli,et al.  Strong uniqueness for stochastic evolution equations in Hilbert spaces perturbed by a bounded measurable drift , 2011, 1109.0363.

[21]  P. Protter Stochastic integration and differential equations , 1990 .

[22]  F. Flandoli,et al.  Well-posedness of the transport equation by stochastic perturbation , 2008, 0809.1310.

[23]  Xicheng Zhang Stochastic Homeomorphism Flows of SDEs with Singular Drifts and Sobolev Diffusion Coefficients , 2010, 1010.3403.

[24]  Gradient estimates and applications for SDEs in Hilbert space with multiplicative noise and Dini continuous drift , 2014, 1404.2990.

[25]  G. Kallianpur Stochastic differential equations and diffusion processes , 1981 .

[26]  P. C. D. Raynal Strong existence and uniqueness for stochastic differential equation with Hölder drift and degenerate noise , 2012, 1205.6688.

[27]  N. H. Bingham,et al.  Regular variation in more general settings , 1987 .

[28]  A. Zvonkin A TRANSFORMATION OF THE PHASE SPACE OF A DIFFUSION PROCESS THAT REMOVES THE DRIFT , 1974 .

[29]  Longjie Xie,et al.  Sobolev differentiable flows of SDEs with local Sobolev and super-linear growth coefficients , 2014, 1407.5834.