Cham : , : Springer International Publishing : , : Imprint : Springer, , 2015

3-319-20997-3

1 online resource (155 p.)

Lecture Notes of the Unione Matematica Italiana, , 1862-9113 ; ; 17

515.353

Partial differential equations

Physics

Differential geometry

Partial Differential Equations

Mathematical Methods in Physics

Differential Geometry

Inglese

Description based upon print version of record.

Includes bibliographical references and index.

Operators and Spaces -- Weak Solutions --  Strong Solutions, m + k _ 4 -- Semi-Strong Solutions, m = 2, k = 1.

In these notes we consider two kinds of nonlinear evolution problems of von Karman type on Euclidean spaces of arbitrary even dimension. Each of these problems consists of a system that results from the coupling of two highly nonlinear partial differential equations, one hyperbolic or parabolic and the other elliptic. These systems take their name from a formal analogy with the von Karman equations in the theory of elasticity in two dimensional space. We establish local (respectively global) results for strong (resp., weak) solutions of these problems and corresponding well-posedness results in the Hadamard sense. Results are found by obtaining regularity estimates on solutions which are limits of a suitable Galerkin approximation scheme. The book is intended as a pedagogical introduction to a number of meaningful application of classical methods in nonlinear Partial Differential Equations of Evolution. The material is self-contained and most proofs are given in full detail. The interested reader will gain a deeper insight

into the power of nontrivial a priori estimate methods in the qualitative study of nonlinear differential equations.