Levy Laplacian

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Klappentext This 2005 text was the first book on the Levy Laplacian that generalized classical work and could be widely applied. Zusammenfassung The Lévy Laplacian is an infinite-dimensional generalization of the well-known classical Laplacian. The theory has become well developed in recent years and this book was the first systematic treatment. With an extensive bibliography, the work will be valued by those working in functional analysis, partial differential equations and probability theory. Inhaltsverzeichnis Introduction; 1. The Lévy Laplacian; 2. Lévy-Laplace operators; 3. Symmetric Lévy-Laplace operators; 4. Harmonic functions of infinitely many variables; 5. Linear elliptic and parabolic equations with Lévy Laplacians; 6. Quasilinear and nonlinear elliptic equation with Lévy Laplacians; 7. Nonlinear parabolic equations with Lévy Laplacians; 8. Appendix. Lévy-Dirichlet forms and associated Markov processes; Bibliography; Index.