A Short Course on Spectral Theory
Arveson, William.
A Short Course on Spectral Theory [electronic resource] / by William Arveson. - 1st ed. 2002. - X, 142 p. online resource. - Graduate Texts in Mathematics, 209 2197-5612 ; . - Graduate Texts in Mathematics, 209 .
Spectral Theory and Banach Algebras -- Operators on Hilbert Space -- Asymptotics: Compact Perturbations and Fredholm Theory -- Methods and Applications.
This book presents the basic tools of modern analysis within the context of the fundamental problem of operator theory: to calculate spectra of specific operators on infinite dimensional spaces, especially operators on Hilbert spaces. The tools are diverse, and they provide the basis for more refined methods that allow one to approach problems that go well beyond the computation of spectra: the mathematical foundations of quantum physics, noncommutative k-theory, and the classification of simple C*-algebras being three areas of current research activity which require mastery of the material presented here. The book is based on a fifteen-week course which the author offered to first or second year graduate students with a foundation in measure theory and elementary functional analysis.
9780387215181
10.1007/b97227 doi
Mathematical analysis.
Analysis (Mathematics).
Operator theory.
Functional analysis.
Analysis.
Operator Theory.
Functional Analysis.
QA299.6-433
515
A Short Course on Spectral Theory [electronic resource] / by William Arveson. - 1st ed. 2002. - X, 142 p. online resource. - Graduate Texts in Mathematics, 209 2197-5612 ; . - Graduate Texts in Mathematics, 209 .
Spectral Theory and Banach Algebras -- Operators on Hilbert Space -- Asymptotics: Compact Perturbations and Fredholm Theory -- Methods and Applications.
This book presents the basic tools of modern analysis within the context of the fundamental problem of operator theory: to calculate spectra of specific operators on infinite dimensional spaces, especially operators on Hilbert spaces. The tools are diverse, and they provide the basis for more refined methods that allow one to approach problems that go well beyond the computation of spectra: the mathematical foundations of quantum physics, noncommutative k-theory, and the classification of simple C*-algebras being three areas of current research activity which require mastery of the material presented here. The book is based on a fifteen-week course which the author offered to first or second year graduate students with a foundation in measure theory and elementary functional analysis.
9780387215181
10.1007/b97227 doi
Mathematical analysis.
Analysis (Mathematics).
Operator theory.
Functional analysis.
Analysis.
Operator Theory.
Functional Analysis.
QA299.6-433
515