Von Neumann algebrasSee also what's at Wikipedia, your library, or elsewhere.
Broader terms:Used for: Algebras, W
 Algebras, Von Neumann
 Rings of operators
 W*algebras
 Neumann algebras

Filed under: Von Neumann algebras
Items below (if any) are from related and broader terms.
Filed under: Hilbert space The Contraction Mapping Principle and Some Applications (EJDE monograph #9, 2009), by R. M. Brooks and Klaus Schmitt (PDF with commentary at ams.org)
 Periodic Solutions for Evolution Equations (EJDE monograph #3, 2002), by Mihai Bostan (PDF with commentary at ams.org)
 Hilbert Space Methods for Partial Differential Equations, by R. E. Showalter (PDF files at ams.org)
 Introduction to the theory of Hilbert spaces. (Stillwater, Okla., Reasearch [sic] Foundation, 1950), by Nachman Aronszajn (page images at HathiTrust)
 Spectral theory of operators in Hilbert space. : [Lecture notes]. ([New York] : Institute of Mathematical Sciences, New York University, 1960, [pref. 1961]), by K. O. Friedrichs (page images at HathiTrust)
 The RayleighRitz and the Weinstein methods for approximation of eigenvalues. (Stillwater, Okla., Oklahoma Agricultural and Mechanical College, Dept. of Mathematics, 1949), by Nachman Aronszajn (page images at HathiTrust)
 Theory of spectral multiplicity / ([Chicago? University of Chicago?, 1949?]), by Paul R. Halmos (page images at HathiTrust)
 Introduction to Hilbert space. (New York, Oxford University Press, 1961), by Sterling K. Berberian (page images at HathiTrust)
 Mass renormalization and spectral shifts. ([New York] New York University, 1960), by Jacob T. Schwartz (page images at HathiTrust)
 An exposition of Hilbert space and linear operators for engineers and scientists. (Griffis Air Force Base, N.Y., Rome Air Development Center, Air Force Systems Command, 1968), by Fazlollah M. Reza (page images at HathiTrust)
 Structure theorems for certain scalarproduct algebras. (Washington, Catholic University of America Press, 1959), by James F. Smith (page images at HathiTrust; US access only)
 DavidonBroyden rankone minimization methods in Hilbert space with application to optimal control problems / (Washington, D.C. : National Aeronautics and Space Administration ; [Springfield, Va. : For sale by the National Technical Information Service], 1972), by Terry A. Straeter and Langley Research Center (page images at HathiTrust)
 A first course in Hilbert space. (Iowa City, Dept. of Mathematics and Astronomy, State University of Iowa, 1959), by Sterling K. Berberian (page images at HathiTrust)
 Normal dilations. ([Ithaca, N.Y.], 1963), by Charles Arnold Berger (page images at HathiTrust)
 Coupledchannels method for rearrangement collisions, ([Washington] National Aeronautics and Space Administration; for sale by the Clearinghouse for Federal Scientific and Technical Information, Springfield, Va., [1968]), by Howard Charles Volkin (page images at HathiTrust; US access only)
 On the volume of smooth convex bodies in hilbert space., by E.R Lorch, United States. Air Force. Office of Scientific Research, and Columbia University (page images at HathiTrust)
 Limits at infinity of semi groups of contraction / ([Washington, D.C.] : [Air Force Office of Scientific Research, Air Research and Development Command, United States Air Force], [1961.]), by Shaul R. Foguel, Universi©øtah ha℗ʻIvrit biYerushalayim, and United States. Air Force. Office of Scientific Research (page images at HathiTrust)
 Application of Hilbert space methods to lie groups acting on a differentiable manifold /, by Jacqueline LelongFerrand, N.J.) Institute for Advanced Study (Princeton, Universit©Øe de Paris, and United States. Air Force. Office of Scientific Research (page images at HathiTrust)
 Commutators on a Hilbert space /, by C. R. Putnam, United States. Air Force. Office of Scientific Research, Purdue Research Foundation, and Purdue University (page images at HathiTrust)
 Commutators on a Hilbert space : a note on nonnegative matrices /, by C. R. Putnam, Purdue University, and United States. Air Force. Office of Scientific Research (page images at HathiTrust)
 Application of the theory of linear operators in Hilbert space to potential theory /, by E. J. Specht, H. T. Jones, United States. Air Force. Office of Scientific Research, and Emmanuel Missionary College (page images at HathiTrust)
 On the Hilbert matrix,, by Marvin Rosenblum, United States. Air Force. Office of Scientific Research, and University of Virginia. Department of Mathematics (page images at HathiTrust)
 On a Theorem of Fuglede and Putnam /, by Marvin Rosenblum, University of Virginia, and United States. Air Force. Office of Scientific Research (page images at HathiTrust)
 Commutators on a Hilbert Space : On the numerical ranges of commutators /, by C. R. Putnam, United States. Air Force. Office of Scientific Research, and Purdue University (page images at HathiTrust)
 Commutators on a Hilbert Space : Commutators and normal operators /, by C. R. Putnam, United States. Air Force. Office of Scientific Research, and Purdue University (page images at HathiTrust)
 On the Measure of Hilbert neighborhoods for processes with stationary, independent increments /, by Glen Baxter, United States. Air Force. Office of Scientific Research, and University of Minnesota (page images at HathiTrust)
 Commutators on a Hilbert Space : On Bounded matrices with nonnegative elements /, by C. R. Putnam, United States. Air Force. Office of Scientific Research, and Purdue University (page images at HathiTrust)
 Commutators on a Hilbert Space : On square roots and logarithms of operators /, by C. R. Putnam, United States. Air Force. Office of Scientific Research, Purdue Research Foundation, and Purdue University (page images at HathiTrust)
 Commutators on a Hilbert Space : on Toeplitz matrices, absolute continuity, and unitary equivalence /, by C. R. Putnam, United States. Air Force. Office of Scientific Research, and Purdue University (page images at HathiTrust)
 Commutators on a Hilbert space : a note on Toeplitz matrices and unitary equivalence /, by C. R. Putnam, Purdue University, and United States. Air Force. Office of Scientific Research (page images at HathiTrust)
 Semisimilarity invariants for spectral operators on Hilbert space /, by Alvin N. Feldzamen, University of Chicago. Department of Mathematics, and United States. Air Force. Office of Scientific Research (page images at HathiTrust)
 Commutators on a Hilbert space : group commutators of bounded operators in Hilbert space /, by C. R. Putnam and United States. Air Force. Office of Scientific Research (page images at HathiTrust)
 Commutators on a Hilbert space : a note on the spectra of group commutators /, by C. R. Putnam and United States. Air Force. Office of Scientific Research (page images at HathiTrust)
 Commutators on a Hilbert space : commutators, perturbations, and unitary spaces /, by C. R. Putnam, Purdue University, and United States. Air Force. Office of Scientific Research (page images at HathiTrust)
 Stability theory of nonlinear operational differential equations in Hilbert spaces, ([Washington] National Aeronautics and Space Administration, [1969]), by ChiaVen Pao, University of Pittsburgh, and United States National Aeronautics and Space Administration (page images at HathiTrust; US access only)
 Introduction to Hilbert space and the theory of spectral multiplicity. (New York, Chelsea Pub. Co., [c1957]), by Paul R. Halmos (page images at HathiTrust)
Filed under: Spectral theory (Mathematics) Precise Spectral Asymptotics for Elliptic Operators Acting in Fiberings over Manifolds With Boundary (1984), by Victor Ivrii (DjVu at Toronto)
 Chebyshev and Fourier Spectral Methods (second edition), by John P. Boyd (PDF with commentary at Citeseer)
 Spectral theory of operators in Hilbert space. : [Lecture notes]. ([New York] : Institute of Mathematical Sciences, New York University, 1960, [pref. 1961]), by K. O. Friedrichs (page images at HathiTrust)
 Mass renormalization and spectral shifts. ([New York] New York University, 1960), by Jacob T. Schwartz (page images at HathiTrust)
 Tables of bias functions, B₁ and B₂, for variances based on finite samples of processes with power law spectral densities / (Washington, D.C. : U.S. Dept. of Commerce, National Bureau of Standards]; For sale by the Supt. of Docs., U.S. Govt. Print. Off.], 1969), by J. A. Barnes and United States. National Bureau of Standards (page images at HathiTrust)
 A spectral collocation solution to the compressible stability Eigenvalue problem / (Washington, D.C. : National Aeronautics and Space Administration, Scientific and Technical Information Division ; [Springfield, Va. : For sale by the National Technical Information Service], 1988), by Michele G. Macaraeg, M. Yousuff Hussaini, Craig L. Streett, and United States. National Aeronautics and Space Administration. Scientific and Technical Information Division (page images at HathiTrust)
 Comparison of power spectral density techniques as applied to digitalized data records of nonstationary processes / (Menlo Park, Calif. : [s.n.], 1963), by George W. Evans (page images at HathiTrust; US access only)
 Spectral estimation / (Newport, R.I. : Naval Underwater Systems Center, [between 1977 and 1980]) (page images at HathiTrust)
 Development of a powerspectral gust design procedure for civil aircraft / (Burbank, Calif. : LockheedCalifornia Co., 1966), by Frederic M Hoblit and United States. Federal Aviation Agency. Aviation Research and Development Service (page images at HathiTrust)
 A spectral theory for the stationary transport operator in slab geometry / (Argone, Ill. : Argonne National Laboratory, 1964), by Erwin H. Bareiss, U.S. Atomic Energy Commission. ANL., and Argonne National Laboratory. Applied Mathematics Division. ANL (page images at HathiTrust)
 Spectral analysis of Columbia River estuary currents / (Vicksburg, Miss. : Dept. of the Army, Waterways Experiment Station, Corps of Engineers ; [Springfield, Va.] : [Available from National Technical Information Service], [1985]), by Barbara P. Hydraulics Laboratory Donnell, William H. McAnally, and U.S. Army Engineer Waterways Experiment Station (page images at HathiTrust)
 Summer Institute on Spectral Theory and Statistical Mechanics, 1965. (Upton, N.Y., Brookhaven National Laboratory available from the Clearinghouse for Federal Scientific and Technical Information, Springfield, Va., 1966), by Summer Institute on Spectral Theory and Statistical Mechanic (1965 : Brookhaven National Laboratory), ed. by J. D Pincus (page images at HathiTrust; US access only)
 Accuracy and speed in computing the Chebyshev collocation derivative / (Washington, D.C. : National Aeronautics and Space Administration, Office of Management, Scientific and Technical Information Program ; Springfield, Va. : For sale by the National Technical Information Service, 1991), by Wai Sun Don, Alex Solomonoff, Langley Research Center, and Brown University. Division of Applied Mathematics (page images at HathiTrust)
 Convolution operators that satisfy the spectral theorem : Technical note no. 6. /, by Gregers Krabbe and United States. Air Force. Office of Scientific Research (page images at HathiTrust)
 Basic mathematical research for electromagnetic theory : technical note no. 4 /, by Gregers Krabbe, Purdue University, and United States. Air Force. Office of Scientific Research (page images at HathiTrust)
 The Spectral theory of bounded functions /, by C. Herz, United States. Air Force. Office of Scientific Research, and N.J.) Institute for Advanced Study (Princeton (page images at HathiTrust)
More items available under broader and related terms at left. 