This volume contains the expanded lecture notes of courses taught at the Emile Borel Centre of the Henri Poincare Institute (Paris) on heat kernels, random walks, and analysis on manifolds and graphs. In the book, leading experts introduce recent research in their fields. The unifying theme is the study of heat kernels in various situations using related geometric and analytic tools. Topics include analysis of complex-coefficient elliptic operators, diffusions on fractals and on infinite-dimensional groups, heat kernel and isoperimetry on Riemannian manifolds, heat kernels and infinite dimensional analysis, diffusions and Sobolev-type spaces on metric spaces, quasi-regular mappings and $p$-Laplace operators, heat kernel and spherical inversion on $SL_2(C)$, random walks and spectral geometry on crystal lattices, isoperimetric and isocapacitary inequalities, and generating function techniques for random walks on graphs. This volume is suitable for graduate students and research mathematicians interested in random processes and analysis on manifolds.Lecture Notes from a Quarter Program on Heat Kernels, Random Walks, and Analysis on Manifolds and Graphs : April 16-July 13, 2002, Emile Borel ... Therefore, putting A(g) = A, aquot;Ad(g) and b(g) = A, aquot;Ad(g)(c), we have do o g = A(g) bo + b(g).
|Title||:||Heat Kernels and Analysis on Manifolds, Graphs, and Metric Spaces|
|Author||:||Pascal Auscher, T. Coulhon, Alexander Grigoryan|
|Publisher||:||American Mathematical Soc. - 2003|