The boundary-domain integral method for elliptic systems

- Pomp, Andreas

Related Books: 1

Author(s)

- Pomp, Andreas

Bibliographic Information

The boundary-domain integral method for elliptic systems

Andreas Pomp

（Lecture notes in mathematics, 1683）

Springer, c1998

: pbk

Other Title: The boundary-domain integral method for elliptic systems : with an application to shells

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Note

Includes bibliographical references (p. [157]-163) and index

Description and Table of Contents

Description

This monograph gives a description of all algorithmic steps and a mathematical foundation for a special numerical method, namely the boundary-domain integral method (BDIM). This method is a generalization of the well-known boundary element method, but it is also applicable to linear elliptic systems with variable coefficients, especially to shell equations. The text should be understandable at the beginning graduate-level. It is addressed to researchers in the fields of numerical analysis and computational mechanics, and will be of interest to everyone looking at serious alternatives to the well-established finite element methods.

Table of Contents

Pseudohomogeneous distributions.- Levi functions for elliptic systems of partial differential equations.- Systems of integral equations, generated by Levi functions.- The differential equations of the DV model.- Levi functions for the shell equations.- The system of integral equations and its numerical solution.- An example: Katenoid shell under torsion.

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The boundary-domain integral method for elliptic systems

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