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EducationPh.D. (2009) University of California at San Diego Research Area: geometric analysis, probability theoryI am interested in the study of hypoelliptic partial differential operators, and in particular their heat equations. Lie groups such as the Heisenberg group and its generalizations provide a natural setting, and tools from Riemannian and sub-Riemannian geometry are highly relevant. Recently I have been studying sharp heat kernel estimates, gradient bounds, logarithmic Sobolev inequalities, and other functional inequalities for these operators. I am also interested in the application of probabilistic methods, such as infinite dimensional calculus, to better understand these types of problems. Selected PublicationsPrecise estimates for the subelliptic heat kernel on H-type groups, J. Math. Pures. Appl. 92 (2009), 52–85. doi:10.1016/j.matpur.2009.04.011. arXiv:0810.3218v2 [math.AP]. Gradient estimates for the subelliptic heat kernel on H-type groups, J. Funct. Anal (to appear). arXiv:0904.1781v1 [math.AP]. Last modified: September 11, 2009 |
