Transmission Problems for Elliptic Second-Order Equations in Non-Smooth Domains [recurso electrónico] / by Mikhail Borsuk.

Por: Borsuk, Mikhail [author.]Colaborador(es): SpringerLink (Online service)Tipo de material: Texto

TextoSeries Frontiers in MathematicsEditor: Basel : Springer Basel, 2010Descripción: XI, 218p. 1 illus. in color. online resourceTipo de contenido: text Tipo de medio: computer Tipo de portador: online resourceISBN: 9783034604772Tema(s): Mathematics | Differential equations, partial | Mathematics | Partial Differential EquationsFormatos físicos adicionales: Printed edition:: Sin títuloClasificación CDD: 515.353 Clasificación LoC:QA370-380Recursos en línea: Libro electrónico Texto

Contenidos:

Preliminaries -- Eigenvalue problem and integro-differential inequalities -- Best possible estimates of solutions to the transmission problem for linear elliptic divergence second-order equations in a conical domain -- Transmission problem for the Laplace operator with N different media -- Transmission problem for weak quasi-linear elliptic equations in a conical domain -- Transmission problem for strong quasi-linear elliptic equations in a conical domain -- Best possible estimates of solutions to the transmission problem for a quasi-linear elliptic divergence second-order equation in a domain with a boundary edge.

En: Springer eBooksResumen: The goal of this book is to investigate the behavior of weak solutions of the elliptic transmission problem in a neighborhood of boundary singularities: angular and conic points or edges. This problem is discussed for both linear and quasilinear equations. A principal new feature of this book is the consideration of our estimates of weak solutions of the transmission problem for linear elliptic equations with minimal smooth coeciffients in n-dimensional conic domains. Only few works are devoted to the transmission problem for quasilinear elliptic equations. Therefore, we investigate the weak solutions for general divergence quasilinear elliptic second-order equations in n-dimensional conic domains or in domains with edges. The basis of the present work is the method of integro-differential inequalities. Such inequalities with exact estimating constants allow us to establish possible or best possible estimates of solutions to boundary value problems for elliptic equations near singularities on the boundary. A new Friedrichs–Wirtinger type inequality is proved and applied to the investigation of the behavior of weak solutions of the transmission problem. All results are given with complete proofs. The book will be of interest to graduate students and specialists in elliptic boundary value problems and applications.

Existencias ( 1 )
Notas de título ( 3 )

Existencias
Tipo de ítem	Biblioteca actual	Colección	Signatura	Copia número	Estado	Fecha de vencimiento	Código de barras
Libro Electrónico	Biblioteca Electrónica	Colección de Libros Electrónicos	QA370 -380 (Browse shelf(Abre debajo))	1	No para préstamo		373026-2001

The goal of this book is to investigate the behavior of weak solutions of the elliptic transmission problem in a neighborhood of boundary singularities: angular and conic points or edges. This problem is discussed for both linear and quasilinear equations. A principal new feature of this book is the consideration of our estimates of weak solutions of the transmission problem for linear elliptic equations with minimal smooth coeciffients in n-dimensional conic domains. Only few works are devoted to the transmission problem for quasilinear elliptic equations. Therefore, we investigate the weak solutions for general divergence quasilinear elliptic second-order equations in n-dimensional conic domains or in domains with edges. The basis of the present work is the method of integro-differential inequalities. Such inequalities with exact estimating constants allow us to establish possible or best possible estimates of solutions to boundary value problems for elliptic equations near singularities on the boundary. A new Friedrichs–Wirtinger type inequality is proved and applied to the investigation of the behavior of weak solutions of the transmission problem. All results are given with complete proofs. The book will be of interest to graduate students and specialists in elliptic boundary value problems and applications.