The Lévy Laplacian

The Lvy 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 Of The LvyLaplace Operator. The Book Describes The Infinite-Dimensional Analogues Of Finite-Dimensional Results And More Especially Those Features Which Appear Only In The Generalized Context. It Develops A Theory Of Operators Generated By The Lvy Laplacian And The Symmetrized Lvy Laplacian As Well As A Theory Of Linear And Nonlinear Equations Involving It. There Are Many Problems Leading To Equations With Lvy Laplacians And To LvyLaplace Operators For Example Superconductivity Theory The Theory Of Control Systems The Gauss Random Field Theory And The YangMills Equation. The Book Is Complemented By An Exhaustive Bibliography. The Result Is A Work That Will Be Valued By Those Working In Functional Analysis Partial Differential Equations And Probability Theory.