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Hilbert Space, Boundary Value Problems and Orthogonal Polynomials by Allan M. Krall

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Published by Birkhäuser Basel, Imprint: Birkhäuser in Basel .
Written in English

Subjects:

  • Mathematics

Book details:

About the Edition

This monograph consists of three parts: - the abstract theory of Hilbert spaces, leading up to the spectral theory of unbounded self-adjoined operators; - the application to linear Hamiltonian systems, giving the details of the spectral resolution; - further applications such as to orthogonal polynomials and Sobolev differential operators. Written in textbook style this up-to-date volume is geared towards graduate and postgraduate students and researchers interested in boundary value problems of linear differential equations or in orthogonal polynomials.

Edition Notes

Statementby Allan M. Krall
SeriesOperator Theory: Advances and Applications -- 133, Operator theory, advances and applications -- 133.
Classifications
LC ClassificationsQA1-939
The Physical Object
Format[electronic resource] /
Pagination1 online resource (xiv, 354 p.)
Number of Pages354
ID Numbers
Open LibraryOL27043586M
ISBN 103034894597, 303488155X
ISBN 109783034894593, 9783034881555
OCLC/WorldCa851702844

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Hilbert Space, Boundary Value Problems and Orthogonal Polynomials. Authors: Krall, Allan M. self-adjoint operators, linear Hamiltonian systemsand their scalar counterparts and their application to orthogonal polynomials. In a sense, this is an updating of E. C. Titchmarsh's classic Eigenfunction Expansions. Book Title Hilbert Space.   Buy Hilbert Space, Boundary Value Problems and Orthogonal Polynomials (Operator Theory: Advances and Applications) on FREE SHIPPING on qualified orders. Get this from a library! Hilbert space, boundary value problems, and orthogonal polynomials. [Allan M Krall] -- This monograph consists of three parts: the abstract theory of Hilbert spaces, leading up to the spectral theory of unbounded self-adjoined operators; - the application to linear Hamiltonian. Hilbert space, boundary value problems, and orthogonal polynomials A.M. Krall Written in textbook style this up-to-date volume is geared towards graduate and postgraduate students and researchers interested in boundary value problems of linear differential equations or in orthogonal polynomials.

Hilbert Space, Boundary Value Problems and Orthogonal Polynomials Allan M. Krall (auth.) The following tract is divided into three parts: Hilbert spaces and their (bounded and unbounded) self-adjoint operators, linear Hamiltonian systemsand their scalar counterparts and their application to orthogonal polynomials. Get this from a library! Hilbert Space, boundary value problems and orthogonal polynomials. [Allan M Krall]. Hilbert Space, Boundary Value Problems and Orthogonal Polynomials. Hilbert space, boundary value problems, and orthogonal. Cite this chapter as: Krall A.M. () Orthogonal Polynomials. In: Hilbert Space, Boundary Value Problems and Orthogonal Polynomials. Operator Theory: Advances and Applications, vol

Krall A.M. Hilbert Space, Boundary Value Problems and Orthogonal Polynomials They did things "right." It was a revelation to read the book and papers by Professor Atkinson and the many fine fundamen­ tal papers by Professor Everitt. with One Singular Point The Spectral Resolution for Linear Hamiltonian Systems with Two Singular Points. Hilbert space, boundary value problems, and orthogonal polynomials. Birkhäuser Verlag. A.M. Krall. Year: Language: english. File: DJVU, MB. Sailplanes by Schweizer: A History. Airlife. Paul a Schweizer. Year: You can write a book review and share your experiences. Other readers will always be interested in your opinion of. Example: orthogonal polynomials 16 Orthogonal complements, The Projection Theorem 16 Least squares approximation via subspaces 17 4. Linear operators in Hilbert spaces 18 Shift operators on ‘2 19 Unitary operators. Isomorphic Hilbert spaces 19 Integral operators 20 Di erential operators in L2[a;b] 22 A. This book is aimed at senior undergraduate and first year graduate students of mathematics, engineering, physics, and chemistry. It is very modern in point of view and notation. The book looks at the standard problems from a contemporary Sobolev point of view, a view more consonant with dynamical systems and numerical methods.