4 1.rückner, M., Zhang, X.(2009): existence, uniqueness and ergodicity of randomly tamed three-dimensional Navier-Stokes equation. Prob。 Theory and relationship. Fields, in press.
40. Goldys B., Rü ckner M., Zhang X.(2009): Martingale solutions and Markov selection of stochastic partial differential equations. Stochastic process and its application, in publication.
39. Zhang, X.(2009): Exponential ergodicity of non-Lipschitz stochastic differential equations. Go on. Amir. mathmatics Socialists137 (2009), 317-327.
38. Joe, H, Zhang, X: Homeomorphic flows of non-Lipschitz stochastic differential equations with jumps. Stochastic process and its application, 1 18 (2008), pp. 2254-2268.
37.rüCK ner, M., Schmuland, B., Zhang, X.(2008): Yamada-Watanabe Theorem of Infinite Dimensional Stochastic Evolution Equation. Physics of condensed matter, Vol. 1 1, No.2(54), 247-259(2008).
36. Zhang, X.(2008): Regularity criteria for solutions of three-dimensional Navier-Stokes equations. Math J. Analysis and Application, Volume 346, pp. 336-339 (2008).
35. Ren, Zhang, et al. (2008): Freidlin-wentzels large deviation of stochastic evolution equations. Journal of Functional Analysis, Volume 254, 3 148-3 172(2008).
34. Zhang, X.(2008): Euler Scheme and Large Deviation of Stochastic Volterra Equation with Singular Kernel. Differential equation J. Vol. 224 2226-2250(2008).
33. Wang, Zhang and Zhang (2007): Non-Lipschitz Backward Stochastic Volterra Equation with Jump. Stochastic and Dynamics, Volume 7 (2007), No.4, pp. 479-496.
32. Zhang, Zhang, Zhang (2007): Probability Method of Spatial Homogeneous Boltzmann Equation. Stochastic Analysis and Application, Volume 25,1129-1150.
3 1. Zhang, X.(2007): regularity of semilinear stochastic partial differential equations. J. interesting Anal. , vol. 249, No.2, 15, August 2007, pp. 454-476.
Ren Jun, Zhang, Xie (2007): Regularity of local time of random fields. J. interesting Anal. , Volume 249, Issue 1, Issue 1 in August 2007, Page 199-2 19.
29. Ren, Lyckner, Zhang, Zhang (2007):ku suoka-strook formula and regularity and potential analysis of jumping local time, Vol.26, No.4, pp.363-396 (2007).
28. Zhang, X.(2007): Skorohod problem and multivalued stochastic evolution equations in Banach spaces. Bull. Sci。 mathmatics France, 13 1, pp. 175-2 17.
27. Joe, H, Zhang, x(2007): Homeomorphism of solutions of backward stochastic differential equations and its applications, stochastic processes and their applications, vol. 1 17/3, pp. 399-408.
26. Zhang, X. (2007): Variational Approximation of Fokker-Planck Equation on Riemannian Manifold, Prob. Theory and Relationship. Fields, vol. 137, No.3, pp. 5 19-539.
25. Ren, Zhang, X.(2006): Continuous modules of stochastic homeomorphism flow for stochastic differential equations with non-Lipschitz coefficients, function theory. Anal. , vol. 24 1, No.2, pp. 439-456.
24. Zhang, X, Zhu Jun (2006): Non-Lipschitz stochastic differential equations driven by multi-parameter Brownian motion, randomness and dynamics, Vol.6, No.3, 329-340.
23. Zhang, x(2006): Lp theory of semilinear partial differential equations on general measure space and its application, Acta Functionalica. Anal. , pp. 44-75, vol. 239/ 1.
22.Cruzeiro, A.B. and Zhang, X.(2006): Bismut-type formula of diffusion semigroups on Riemannian manifolds, potential analysis, Vol.25, No.2, pp.:12/-130.
2 1. Zhang, Zhang, Zhang (2006): Support for the Measure Solution of Spatial Homogeneous Boltzmann Equation, Journal of Statistical Physics, 124, No.2, pp. 485-495.
20. Zhang, x(2006): Relative compactness criteria of Hilbert-valued random fields in abstract Wiener space, Journal of China Academy of Sciences. Paris, celi 1. , vol. 342, No.6, pp. 437-440.
19. Zhang, X.(2006): Euler-Maruyama approximation of stochastic differential equations with non-Lipschitz coefficients and its application, Journal of Mathematics. Anal. And applications, vol. 3 16/2, pp. 447-458.
18. Zhang, x(2006): family of relatively compact functionals on abstract Wiener space and their applications, Journal of Functional Analysis, 232/ 1, 195-22 1.
17.Privault, N., Zhang, X. (2005): Deviation Inequality and Law of Repeated Logarithms in Path Space on Loop Group, Random and Random Report, Vol. 77, No.6, 5 15-536.
16. Cao Gang, He, Zhang, Zhang (2005): Successive approximation, randomness and dynamics of infinite dimensional stochastic differential equations with jumps, Vol.5, No.4, 609-6 19.
15. Zhang, X.(2005): Strong solutions of stochastic differential equations with singular drift and Sobolev diffusion coefficient, stochastic processes and their applications,115/1the first1805-.
14. Ren, Zhang (2005): Freidlin-wentzels large deviation of homeomorphism flow of non-Lipschitz stochastic differential equations. Sci。 mathmatics 2 series, vol. 129/8, pp. 643-655.
13. Zhang, X.(2005): Metric Entropy of Sets in Abstract Wiener Space. Sci。 mathmatics 2 series, vol. 129, No.7, pp. 559-566.
12. Ren, Zhang (2005): Theorem of Brownian Motion on Differential Isomorphism Groups of Circles. Anal. , vol. 224, I. 1, 107- 133.
1 1. Zhang, X.(2005): homeomorphism flow, stochastic process and its application of multidimensional stochastic differential equations with non-Lipschitz coefficients,115,435-448 (2005). (Corrigendum)116,873-875 (2006).
10. Zhang, X.(2004): the horizontal elevation of Ornstein- Uhlenbeck process in the path space on Riemannian manifold. Bull. Sci。 mathmatics Series 2, vol. 128, No.5, pp. 333-340.
9.Cruzeiro, A.B. and Zhang, X.(2003): Finite dimensional approximation of Riemannian path space geometry. J. Func。 Anal. , Volume 205, No.65438+0,206-270.
8. Ren, Zhang, Zhang (2003): Random flow of stochastic differential equations with non-Lipschitz coefficients. Bull. Sci。 mathmatics Series 2, vol. 127, No.8, pp. 739-754.
7. Ren, Zhang, et al. (2003): Path continuity of fractional Dirichlet functional. Bull. Sci。 mathmatics Series 2, vol. 127, No.4, pp. 368-378.
6. Zhang, X. (2002): Regularity of stopping time of diffusion process in Besov space. Mathematical research, vol. 15 1,No. 1, pp. 23-29.
5. Ren Jun, Zhang, et al. (2002): Quasi-real analysis of stochastic differential equations with two parameters. Random statistics and random statistics report, vol. 72, nos. 3-4, 25 1-276.
4. Zhang, X. (200 1): Quasi-everywhere regularity of1dimensional diffusion process in Besov space. Statistics and information. Probabilistic Letters, Volume 54, No.2, 16 1- 169.
3. Zhang, Xu, Zhou (2000): Stochastic differential equations on the plane. Random Statistics and Random Statistics Report, Volume 69,No. 1-2, 105- 12 1.
2. Zhang (2000): Smoothness of indicator function of some sets in Wiener space. Math J. Pures Appl, vol. 79, No.5, 5 15-523.
1. Ainot, H, Ren, J and Zhang, x(2000): Smoothness of Semimartingale Local Time. American Academy of Science. Paris, t.330, Sèrie 1, vol. 330, No.8, 7 19-724.