Record Nr.

UNINA9910785935603321

Autore

Schuster Thomas <1971->

Titolo

Regularization methods in Banach spaces [[electronic resource] /] / by Thomas Schuster ... [et al.]

Pubbl/distr/stampa


Berlin ; ; Boston, : De Gruyter, c2012

ISBN

3-11-025572-3

1-283-62792-2

9786613940377

Descrizione fisica

1 online resource (296 p.)

Collana

Radon series on computational and applied mathematics, , 1865-3707 ; ; 10

Radon Series on Computational and Applied Mathematics ; ; 10

Classificazione

SK 520

Disciplina

515/.732

Soggetti

Banach spaces

Parameter estimation

Differential equations, Partial

Lingua di pubblicazione

Inglese

Formato

Materiale a stampa

Livello bibliografico

Monografia

Note generali

Description based upon print version of record.

Nota di bibliografia

Includes bibliographical references and index.

Nota di contenuto

Front matter -- Preface -- Contents -- Part I. Why to use Banach spaces in regularization theory? -- Part II. Geometry and mathematical tools of Banach spaces -- Part III. Tikhonov-type regularization -- Part IV. Iterative regularization -- Part V. The method of approximate inverse -- Bibliography -- Index

Sommario/riassunto

Regularization methods aimed at finding stable approximate solutions are a necessary tool to tackle inverse and ill-posed problems. Inverse problems arise in a large variety of applications ranging from medical imaging and non-destructive testing via finance to systems biology. Many of these problems belong to the class of parameter identification problems in partial differential equations (PDEs) and thus are computationally demanding and mathematically challenging. Hence there is a substantial need for stable and efficient solvers for this kind of problems as well as for a rigorous convergence analysis of these methods. This monograph consists of five parts. Part I motivates the importance of developing and analyzing regularization methods in Banach spaces by presenting four applications which intrinsically

demand for a Banach space setting and giving a brief glimpse of sparsity constraints. Part II summarizes all mathematical tools that are necessary to carry out an analysis in Banach spaces. Part III represents the current state-of-the-art concerning Tikhonov regularization in Banach spaces. Part IV about iterative regularization methods is concerned with linear operator equations and the iterative solution of nonlinear operator equations by gradient type methods and the iteratively regularized Gauß-Newton method. Part V finally outlines the method of approximate inverse which is based on the efficient evaluation of the measured data with reconstruction kernels.