Dunford, Nelson; Schwartz, Jacob T. [Bade, William G.; Bartle, Robert G.] Linear operators. Part II: Spectral theory, self adjoint operators in Hilbert space. With the assistance of William G. Bade and Robert G. Bartle. Repr. of the orig., publ. 1963 by John Wiley & Sons Ltd., Paperback ed. (English) Zbl 0635.47002 Wiley Classics Library. New York etc.: John Wiley & Sons Ltd./Interscience Publishers, Inc. ix, 859-1923 $25.95 (1988). For a review on the original edition see Zbl 0128.348. Cited in 2 ReviewsCited in 198 Documents MSC: 47-02 Research exposition (monographs, survey articles) pertaining to operator theory 47B15 Hermitian and normal operators (spectral measures, functional calculus, etc.) 47F05 General theory of partial differential operators 47B25 Linear symmetric and selfadjoint operators (unbounded) 46J05 General theory of commutative topological algebras 22B05 General properties and structure of LCA groups 47D03 Groups and semigroups of linear operators 47E05 General theory of ordinary differential operators 47A10 Spectrum, resolvent 43A45 Spectral synthesis on groups, semigroups, etc. 47B10 Linear operators belonging to operator ideals (nuclear, \(p\)-summing, in the Schatten-von Neumann classes, etc.) 47B38 Linear operators on function spaces (general) 47A20 Dilations, extensions, compressions of linear operators Keywords:Gel’fand’s representation theory of commutative B- and B *-algebras; Stone-Čech compactification; non-commutative B *-algebras; spectral resolution for normal operators; eigenvalues; minimax theorems; integral formula; unitary invariants of a normal operator; fixed point theorem of Kakutani; Haar measure on compact groups; Peter-Weyl theorem; Bohr compactification; Bohr’s characterization of almost periodic functions; Fourier analysis on locally compact, \(\sigma \)-compact Abelian groups; spectral synthesis; Calderón-Zygmund and Marcinkiewicz theorems; singular convolution operators; spectral study of the compact operators belonging to a v. Neumann-Schatten ideal; Hilbert-Schmidt class; spectral resolution of self-adjoint operators; v. Neumann functional calculus with unbounded functions; extensions of a symmetric operator; Friedrichs’ theorem on the extension of semi-bounded symmetric operators; Stone representation theorem; moment problems; Carleman integral operators; Bade-Schwartz represenation; spectral theory of formally self-adjoint operators made from the functional analytic point of view; Green function; deficiency indices; formally self-adjoint different operators; linear partial differential equations and operators; Gårding-Browder eigenfunction expansion theorem; Gårding inequality; Cauchy problem for symmetric hyperbolic systems; mixed problem for parapolic equations; semi-groups of operators Citations:Zbl 0084.104; Zbl 0093.114; Zbl 0128.348 PDFBibTeX XMLCite \textit{N. Dunford} and \textit{J. T. Schwartz}, Linear operators. Part II: Spectral theory, self adjoint operators in Hilbert space. With the assistance of William G. Bade and Robert G. Bartle. Repr. of the orig., publ. 1963 by John Wiley \& Sons Ltd., Paperback ed. New York etc: John Wiley \&| Sons Ltd./Interscience Publishers, Inc. (1988; Zbl 0635.47002)