Convex Analysis and Nonlinear Geometric Elliptic Equations - Ilya J. Bakelman

Convex Analysis and Nonlinear Geometric Elliptic Equations

Buch | Softcover
XXI, 510 Seiten
2011 | 1. Softcover reprint of the original 1st ed. 1994
Springer Berlin (Verlag)
978-3-642-69883-5 (ISBN)
53,49 inkl. MwSt
Investigations in modem nonlinear analysis rely on ideas, methods and prob lems from various fields of mathematics, mechanics, physics and other applied sciences. In the second half of the twentieth century many prominent, ex emplary problems in nonlinear analysis were subject to intensive study and examination. The united ideas and methods of differential geometry, topology, differential equations and functional analysis as well as other areas of research in mathematics were successfully applied towards the complete solution of com plex problems in nonlinear analysis. It is not possible to encompass in the scope of one book all concepts, ideas, methods and results related to nonlinear analysis. Therefore, we shall restrict ourselves in this monograph to nonlinear elliptic boundary value problems as well as global geometric problems. In order that we may examine these prob lems, we are provided with a fundamental vehicle: The theory of convex bodies and hypersurfaces. In this book we systematically present a series of centrally significant results obtained in the second half of the twentieth century up to the present time. Particular attention is given to profound interconnections between various divisions in nonlinear analysis. The theory of convex functions and bodies plays a crucial role because the ellipticity of differential equations is closely connected with the local and global convexity properties of their solutions. Therefore it is necessary to have a sufficiently large amount of material devoted to the theory of convex bodies and functions and their connections with partial differential equations.

I. Bakelman was an expert in the study of nonlinear elliptic partial differential equations by methods of differential and convex geometry. In Russia he is also recognized as a reformer of mathematical education at both school and university levels. This book represents much of Bakelman's work of the last ten years (until his death in 1992). Much of his work was devoted to boundary value problems for mean curvature and Monge-Ampere equations in more than two variables and their generalizations. The book is suitable as a text book and reference work for graduate students and scientists (mathematicians but also physicists) working in the areas of convex functions and bodies, global geometric problems and nonlinear elliptic boundary value problems.

I. Elements of Convex Analysis.- 1. Convex Bodies and Hypersurfaces.- 2. Mixed Volumes. Minkowski Problem. Selected Global Problems in Geometric Partial Differential Equations.- II. Geometric Theory of Elliptic Solutions of Monge-Ampere Equations.- 3. Generalized Solutions of N-Dimensional Monge-Ampere Equations.- 4. Variational Problems and Generalized Elliptic Solutions of Monge-Ampere Equations.- 5. Non-Compact Problems for Elliptic Solutions of Monge-Ampere Equations.- 6. Smooth Elliptic Solutions of Monge-Ampere Equations.- III. Geometric Methods in Elliptic Equations of Second Order. Applications to Calculus of Variations, Differential Geometry and Applied Mathematics..- 7. Geometric Concepts and Methods in Nonlinear Elliptic Euler-Lagrange Equations.- 8. The Geometric Maximum Principle for General Non-Divergent Quasilinear Elliptic Equations.

Erscheint lt. Verlag 19.11.2011
Zusatzinfo XXI, 510 p.
Verlagsort Berlin
Sprache englisch
Maße 155 x 235 mm
Gewicht 802 g
Themenwelt Mathematik / Informatik Mathematik Analysis
Mathematik / Informatik Mathematik Geometrie / Topologie
Naturwissenschaften Physik / Astronomie
Schlagworte Analysis • Calculus • Convex Analysis • Curvature • differential equation • Differentialgleichungen zweiter Ordnung • eliptic partial differential equations • Maximum • Monge-Ampere equations • nicht-lineare Monge-Ampere Gleichungen • Nonlinear
ISBN-10 3-642-69883-2 / 3642698832
ISBN-13 978-3-642-69883-5 / 9783642698835
Zustand Neuware
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