Hypoelliptic Estimates and Spectral Theory for Fokker-Planck Operators and Witten Laplacians

There has recently been a renewal of interest in Fokker-Planck operators, motivated by problems in statistical physics, in kinetic equations, and differential geometry. Compared to more standard problems in the spectral theory of partial differential operators, those operators are not self-adjoint and only hypoelliptic. The aim of the analysis is to give, as generally as possible, an accurate qualitative and quantitative description of the exponential return to the thermodynamical equilibrium. While exploring and improving recent results in this direction, this volume proposes a review of known techniques on: the hypoellipticity of polynomial of vector fields and its global counterpart, the global Weyl-Hormander pseudo-differential calculus, the spectral theory of non-self-adjoint operators, the semi-classical analysis of Schrodinger-type operators, the Witten complexes, and the Morse inequalities.