Regularity Theory for Quasilinear Elliptic Systems and Monge—Ampère Equations in Two Dimensions
Schulz, Friedmar.
Regularity Theory for Quasilinear Elliptic Systems and Monge—Ampère Equations in Two Dimensions [electronic resource] / by Friedmar Schulz. - XVIII, 130 p. online resource. - Lecture Notes in Mathematics, 1445 0075-8434 ; . - Lecture Notes in Mathematics, 1445 .
Integral criteria for Hölder continuity -- Regularity for linear elliptic equations and quasilinear systems -- Regularity for Monge—Ampère equations -- Function theory of elliptic equations -- Univalent solutions of binary elliptic systems -- Conformal mappings with respect to a Riemannian metric -- Local behavior of solutions of differential inequalities -- Univalent solutions of Heinz-Lewy type systems -- A priori estimates for Monge—Ampère equations -- Regularity and a priori estimates for locally convex surfaces.
These lecture notes have been written as an introduction to the characteristic theory for two-dimensional Monge-Ampère equations, a theory largely developed by H. Lewy and E. Heinz which has never been presented in book form. An exposition of the Heinz-Lewy theory requires auxiliary material which can be found in various monographs, but which is presented here, in part because the focus is different, and also because these notes have an introductory character. Self-contained introductions to the regularity theory of elliptic systems, the theory of pseudoanalytic functions and the theory of conformal mappings are included. These notes grew out of a seminar given at the University of Kentucky in the fall of 1988 and are intended for graduate students and researchers interested in this area.
9783540466789
10.1007/BFb0098277 doi
Global differential geometry.
Global analysis (Mathematics).
Differential Geometry.
Analysis.
QA641-670
516.36
Regularity Theory for Quasilinear Elliptic Systems and Monge—Ampère Equations in Two Dimensions [electronic resource] / by Friedmar Schulz. - XVIII, 130 p. online resource. - Lecture Notes in Mathematics, 1445 0075-8434 ; . - Lecture Notes in Mathematics, 1445 .
Integral criteria for Hölder continuity -- Regularity for linear elliptic equations and quasilinear systems -- Regularity for Monge—Ampère equations -- Function theory of elliptic equations -- Univalent solutions of binary elliptic systems -- Conformal mappings with respect to a Riemannian metric -- Local behavior of solutions of differential inequalities -- Univalent solutions of Heinz-Lewy type systems -- A priori estimates for Monge—Ampère equations -- Regularity and a priori estimates for locally convex surfaces.
These lecture notes have been written as an introduction to the characteristic theory for two-dimensional Monge-Ampère equations, a theory largely developed by H. Lewy and E. Heinz which has never been presented in book form. An exposition of the Heinz-Lewy theory requires auxiliary material which can be found in various monographs, but which is presented here, in part because the focus is different, and also because these notes have an introductory character. Self-contained introductions to the regularity theory of elliptic systems, the theory of pseudoanalytic functions and the theory of conformal mappings are included. These notes grew out of a seminar given at the University of Kentucky in the fall of 1988 and are intended for graduate students and researchers interested in this area.
9783540466789
10.1007/BFb0098277 doi
Global differential geometry.
Global analysis (Mathematics).
Differential Geometry.
Analysis.
QA641-670
516.36