https://orcid.org/0000-0003-2007-1642
References
- M.T.K. Abbassi, N. Amri and C.L. Bejan, Conformal vector fields and Ricci soliton structures on natural Riemann extensions, Mediterr. J. Math. 18(2) (2021), pp. 1–16.
- P.H. Baxendale, Asymptotic behaviour of stochastic flows of diffeomorphisms: Two case studies, Probab. Theory Relat. Fields 73(1) (1986), pp. 51–85.
- P.H. Baxendale, Lyapunov exponents and relative entropy for a stochastic flow of diffeomorphisms, Probab. Theory Relat. Fields 81(4) (1989), pp. 521–554.
- M. Brin and Y. Kifer, Dynamics of Markov chains and stable manifolds for random diffeomorphisms, Ergod. Theory Dyn. Syst. 7(3) (1987), pp. 351–374.
- A. Caminha, The geometry of closed conformal vector fields on Riemannian spaces, Bull. Braz. Math. Soc. New Ser. 42(2) (2011), pp. 277–300
- R. Carmona and F. Cerou, Transport by incompressible random velocity fields: Simulations & mathematical conjectures, in Stochastic Partial Differential Equations: Six Perspectives, Vol. 64, American Mathematical Society, Providence, RI, 1999.
- B.Y. Chen, Total Mean Curvature and Submanifolds of Finite Type, Vol. 27, World Scientific Publishing Company, Singapore, 2014.
- M. Cranston and Y. Le Jan, Geometric evolution under isotropic stochastic flow, Electron. J. Probab. 3 (1998), pp. 1–36
- S. Deshmukh, Geometry of conformal vector fields, Arab J. Math. Sci. 23(1) (2017), pp. 44–73.
- M.P. do Carmo, Riemannian Geometry, Birkhäuser, Boston, 1992.
- S.S. Dragomir, Some Gronwall Type Inequalities and Applications, Nova Science Publishers, Inc., Hauppauge, NY, 2003.
- T.E. Duncan, Fréchet-valued martingales and stochastic integrals, Stoch. Int. J. Probab. Stoch. Process. 1(1–4) (1975), pp. 269–284.
- K.D. Elworthy, Stochastic Differential Equations on Manifolds, Vol. 70, Cambridge University Press, Cambridge, 1982.
- K.D. Elworthy, Geometric aspects of diffusions on manifolds, in École d'Été de Probabilités de Saint-Flour XV–XVII, 1985–87, Springer, Berlin, Heidelberg, 1988, pp. 277–425.
- K.D. Elworthy and S. Rosenberg, Homotopy and homology vanishing theorems and the stability of stochastic flows, Geom. Funct. Anal. 6(1) (1996), pp. 51–78.
- K.D. Elworthy and M. Yor, Conditional expectations for derivatives of certain stochastic flows, Sémin. Probab. Stras. 27 (1993), pp. 159–172.
- Q. Han and J.X. Hong, Isometric Embedding of Riemannian Manifolds in Euclidean Spaces, Mathematical Surveys and Monographs, Vol. 130, American Mathematical Society, Providence, RI, 2006.
- N. Ikeda and S. Watanabe, Stochastic Differential Equations and Diffusion Processes, Elsevier, Tokyo, 2014.
- Y. Kifer, A note on integrability of Cr-norms of stochastic flows and applications, in Stochastic Mechanics and Stochastic Processes, Springer, Berlin, Heidelberg, 1988. p. 125-131
- K. Kinateder and P. McDonald, An Ito formula for domain-valued processes driven by stochastic flows, Probab. Theory Relat. Fields 124(1) (2002), pp. 73–99.
- S. Kobayashi and K. Nomizu, Foundations of Differential Geometry, Vol. 1, Interscience Publishers, New York, London, 1963.
- H. Kunita, Stochastic differential equations and stochastic flows of diffeomorphisms, in École d'Été de Probabilités de Saint-Flour XII-1982. Lecture Notes in Mathematics, Vol. 1097, Springer, Berlin, Heidelberg, 1984. p. 143–303.
- D.S. Ledesma and F.B. Silva, Invariance of 0-currents under diffusions, Stoch. Dyn. 17(2) (2017), Article ID 1750010.
- J.M. Lee, Riemannian Manifolds: An Introduction to Curvature, Vol. 176, Springer, New York, 2006.
- J.M. Lee, Introduction to Smooth Manifolds, Springer, New York, 2013.
- X.-M. Li, Stochastic differential equations on noncompact manifolds: Moment stability and its topological consequences, Probab. Theory Relat. Fields 100(4) (1994), pp. 417–428.
- R. López, Constant Mean Curvature Surfaces with Boundary, Springer Science & Business Media, New York, 2013.
- P.W. Michor, Gauge Theory for Fiber Bundles, Monographs and Textbooks in Physical Sciences, Lecture Notes, Vol. 19, Bibliopolis, Naples, 1991, p. 107.
- B. Oksendal, Stochastic Differential Equations: An Introduction with Applications, Springer, New York, 2013.
- B. O'Neill, Semi-Riemannian Geometry with Applications to Relativity, Academic Press, San Diego, California, 1983.
- R. Schoen, Mean curvature in Riemannian geometry and general relativity, in Global Theory of Minimal Surfaces. Clay Math Proceedings Vol. 2,. American Mathematical Society, Providence, RI (2005), pp. 113–136.
- P. Topping, Lectures on the Ricci Flow, Vol. 325, Cambridge University Press, Cambridge, 2006.
- A.S. Üstünel, A generalization of Itôs formula, J. Funct. Anal. 47 (1982), pp. 143–152.
- A.S. Üstünel, Some applications of stochastic calculus on the nuclear spaces to the nonlinear problems, in Nonlinear Stochastic Problems, Springer, Dordrecht, 1983. p. 481–508
- S. Vadlamani and R. Adler, Global geometry under isotropic Brownian flows, Electron. Commun. Probab. 11 (2006), pp. 182–192.
- N.K. Yip, Stochastic motion by mean curvature, Arch. Ration. Mech. Anal. 144(4) (1998), pp. 313–355.
- C. Zirbel, Translation and dispersion of mass by isotropic Brownian flows, Stoch. Process. Their Appl. 70(1) (1997), pp. 1–29.
- C. Zirbel and E. Cinlar, Mass transport by Brownian flows, in Stochastic Models in Geosystems, Springer, New York, NY, 1997. p. 459–492