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Commutative rings

See also what's at Wikipedia, your library, or elsewhere.

• Rings (Algebra)

• Class groups (Mathematics)
• Local rings
• Noetherian rings

• Groups, rings, modules (Harper & Row, 1974), by Maurice Auslander and David Alvin Buchsbaum (page images at HathiTrust)

• The torsion pontryagin classes (Washington, D.C. : Mathematics Division, Air Force Office of Scientific Research, ARDC, 1961., 1961), by Emery Thomas, United States. Air Force. Office of Scientific Research, and Berkeley University of California (page images at HathiTrust)
• On the homotopy groups of the classical groups (Princeton, New Jersey : Princeton University, [1961]., 1961), by Bruno Harris, United States. Air Force. Office of Scientific Research, and Princeton University (page images at HathiTrust)
• On a special class of current events (Washington, D.C. : Mathematical Sciences Directorate, Air Force Office of Scientific Research, 1961., 1961), by Marcel P. Sch©·utzenberger, United States. Air Force. Office of Scientific Research, and University of North Carolina at Chapel Hill. Department of Statistics (page images at HathiTrust)
• An algebra of additive relations (Washington, D.C. : Mathematical Sciences Directorate, Air Force Office of Scientific Research, 1961., 1961), by Saunders Mac Lane, United States. Air Force. Office of Scientific Research, and University of Chicago. Department of Mathematics (page images at HathiTrust)
• On the equation a(2+n)=b(2+m)c(2+p) in a free group (Washington, D.C. : Mathematical Sciences Directorate, Air Force Office of Scientific Research, 1961., 1961), by Marcel P. Sch©·utzenberger, United States. Air Force. Office of Scientific Research, and University of North Carolina at Chapel Hill. Department of Statistics (page images at HathiTrust)
• On a class of doubly transitive permutation groups (Washington, D.C. : Mathematical Sciences Directorate, Air Force Office of Scientific Research, 1961., 1961), by Noboru Ito, United States. Air Force. Office of Scientific Research, and University of Chicago (page images at HathiTrust)
• On a theorem of Yano and Nagano (Washington, D.C. : Mathematical Sciences Directorate, Air Force Office of Scientific Research, 1961., 1961), by S. I. Goldberg, United States. Air Force. Office of Scientific Research, and Wayne State University (page images at HathiTrust)
• On functional cup-products and the transgression operator (Washington, D.C. : Mathematics Division, Air Force of Scientific Research, ARDC, 1961., 1961), by Emery Thomas, United States. Air Force. Office of Scientific Research, and Berkeley University of California (page images at HathiTrust)
• On stability of compact submanifolds of complex manifolds (Washington, D.C. : Mathematical Sciences Directorate, Air Force Office of Scientific Research, 1961., 1961), by Kunihiko Kodaira, United States. Air Force. Office of Scientific Research, and N.J.) Institute for Advanced Study (Princeton (page images at HathiTrust)
• A remark on finite transducers (Washington, D.C. : Mathematical Sciences Directorate, Air Force Office of Scientific Research, 1961., 1961), by Marcel P. Sch©·utzenberger, United States. Air Force. Office of Scientific Research, and University of North Carolina at Chapel Hill. Department of Statistics (page images at HathiTrust)
• On transitive simple groups of degree 2p, in which the normalizer of a sylow p-subgroup has order 2p (Washington, D.C. : Mathematical Sciences Directorate, Air Force Office of Scientific Research, 1961., 1961), by Noboru Ito, United States. Air Force. Office of Scientific Research, and University of Chicago (page images at HathiTrust)
• On a class of doubly transitive groups (Washington, D.C. : Mathematical Sciences Directorate, Air Force of Scientific Research, 1961., 1961), by Michio Suzuki, United States. Air Force. Office of Scientific Research, and University of Chicago (page images at HathiTrust)
• On Witt's theorem for nonalternating symmetric bilinear forms over a field of characteristic 2 (L.G. Hansom Field, Bedford, Massachusetts : Air Force Cambridge Research Laboratories, Office of Aerospace Research, United States Air Force, 1965., 1965), by Vera Pless and Air Force Cambridge Research Laboratories (U.S.) (page images at HathiTrust)

• Theory of spectral multiplicity (University of Chicago?, 1949), by Paul R. Halmos (page images at HathiTrust)
• A study of solution multiplicity in some problems of mathematical physics (Los Alamos Scientific Laboratory of the University of California, 1960), by George H. Pimbley, Los Alamos Scientific Laboratory, and U.S. Atomic Energy Commission (page images at HathiTrust)
• A multiplicative model for analyzing variances which are affected by several factors. (Washington D. C. : Office of Scientific Research, U.S. Air Force, 1959., 1959), by Robert Bechhofer, United States. Air Force. Office of Scientific Research, and Stanford University. Applied Mathematics and Statistics Laboratory (page images at HathiTrust)
• A Formula for the multiplicity of a weight (Washington, D.C. : United States Air Force, Office of Scientific Research, 1958, 1958), by Bertram Kostant, United States. Air Force. Office of Scientific Research, and Berkeley. Department of Mathematics University of California (page images at HathiTrust)

• Shakespeare's Holinshed : the Chronicle and the historical plays compared (Longmans, Green, and Co., 1896), by Raphael Holinshed and W. G. Boswell-Stone (page images at HathiTrust)

Items below (if any) are from related and broader terms.

• Structure of Rings (American Mathematical Society Colloquium Publications v37; 1956), by Nathan Jacobson (page images at HathiTrust)
• Rings and Ideals (Carus Mathematical Monograph #8; c1948), by Neal Henry McCoy (page images at HathiTrust)
• Rings of Continuous Functions (Princeton, NJ et al.: Van Nostrand, 1960), by Leonard Gillman and Meyer Jerison (page images at HathiTrust)
• Non-commutative rings (Harvard University, 1950), by Richard Brauer and E. Weiss (page images at HathiTrust)
• Local rings. (Interscience Publishers, 1962), by Masayoshi Nagata (page images at HathiTrust)
• Rings (The American mathematical society, 1943), by Nathan Jacobson and American Mathematical Society (page images at HathiTrust)
• Rings of operators (Dept. of Mathematics, University of Chicago, 1955), by Irving Kaplansky (page images at HathiTrust)
• Homological algebra and ring theory (Dept. of Mathematics, Oklahoma State University, 1961), by James Patrick Jans (page images at HathiTrust)
• The Morita theorems. (University of Oregon, 1960), by Hyman Bass (page images at HathiTrust)
• Complete ideals in regular local rings of dimension 2 (Washington D. C. : Mathematical Sciences Directorate, Office of Scientific Research, U.S. Air Force, 1959., 1959), by Oscar Zariski, Harvard University, and United States. Air Force. Office of Scientific Research (page images at HathiTrust)
• Rings of analytic functions ([Washington, D.C.] : [United States Air Force, Office of Scientific Research], 1957., 1957), by John Wermer, United States. Air Force. Office of Scientific Research, and N.J.) Institute for Advanced Study (Princeton (page images at HathiTrust)
• The Wedderburn-Artin structure theorems. ([Iowa City?] : [University of Iowa, Department of Mathematics and Astronomy?], [1957?], 1957), by Sterling K. Berberian (page images at HathiTrust)

• An efficient method for computation of character tables of finite groups. (National Aeronautics and Space Administration; for sale by the Clearinghouse for Federal Scientific and Technical Information, Springfield, Va., 1968), by Gabriel Allen (page images at HathiTrust)

• Rings and Ideals (Carus Mathematical Monograph #8; c1948), by Neal Henry McCoy (page images at HathiTrust)
• Rings of Continuous Functions (Princeton, NJ et al.: Van Nostrand, 1960), by Leonard Gillman and Meyer Jerison (page images at HathiTrust)
• A decomposition theory for representations of C*-algebras. ([Columbia University, Dept. of Mathematics], 1962), by Edward G. Effros and Columbia University. Department of Mathematics (page images at HathiTrust)
• Order ideals in a C*-algebra and its dual. ([Columbia University, Dept. of Mathematics], 1962), by Edward G. Effros and Columbia University. Department of Mathematics (page images at HathiTrust)
• Theory of spectral multiplicity (University of Chicago?, 1949), by Paul R. Halmos (page images at HathiTrust)

• Lebesguesche Integrale und Fouriersche Reihen (W. de Gruyter & Co., 1926), by Ludwig Schlesinger and Abraham Plessner (page images at HathiTrust; US access only)
• Seminar Schwartz (Australian National University, Dept. of Mathematics, Dept. of Pure Mathematics, 1973), by Laurent Schwartz and M. H. Schwartz (page images at HathiTrust)
• Notes on measure theory (Dept. of Mathematics, Tulane University, 1951), by Billy James Pettis (page images at HathiTrust)
• Storng convergence in a product space (Minneapolis, Minnesota : The University of Minnesota, Institute of Technology, 1961., 1961), by J. Serrin, United States. Air Force. Office of Scientific Research, and University of Minnesota. Institute of Technology (page images at HathiTrust)
• Meromorphic functions with two values distributed on a finite number of paths extending to infinity (Washington, D.C. : Mathematical Sciences Directorate, Air Force Office of Scientific Research, 1961., 1961), by Albert Edrei, United States. Air Force. Office of Scientific Research, and Syracuse University (page images at HathiTrust)
• Arithmetic properties of bernoulli convolutions (Washington, D.C. : Mathematics Division, Office of Scientific Research, 1961., 1961), by Adriano M. Garsia, United States. Air Force. Office of Scientific Research, and University of Minnesota (page images at HathiTrust)
• Mean convergence on orthogonal series and conjugate series (St. Louis, Missouri, : Washington University in St. Louis, 1961., 1961), by Richard Askey, United States. Air Force. Office of Scientific Research, and Mo.) Washington University (Saint Louis (page images at HathiTrust)
• On a special class of current events (Washington, D.C. : Mathematical Sciences Directorate, Air Force Office of Scientific Research, 1961., 1961), by Marcel P. Sch©·utzenberger, United States. Air Force. Office of Scientific Research, and University of North Carolina at Chapel Hill. Department of Statistics (page images at HathiTrust)
• On the Rate of growth of the partial maxima of a sequence of independent, identically distributed random variables ([Washington, D.C.] : Air Force Office of Scientific Research, United States Air Force, 1961., 1961), by O. E. Barndorff-Nielsen, Aarhus universitet, and United States. Air Force. Office of Scientific Research (page images at HathiTrust)
• Existence of invariant measures for Markov processes ([Washington, D.C.] : [Air Force Office of Scientific Research, United States Air Force], 1961., 1961), by S. R. Fougel and United States. Air Force. Office of Scientific Research (page images at HathiTrust)
• On the Probability measures related to the Navier-Stokes equations in the 3-dimensional case ([Washington, D.C.] : Air Force Office of Scientific Research, United States Air Force, 1961., 1961), by G. Prodi, United States. Air Force. Office of Scientific Research, and Universit©Ła degli studi di Trieste (page images at HathiTrust)
• Markov processes with stationary measure ([Washington, D.C.] : [Air Force Office of Scientific Research, United States Air Force], 1961., 1961), by Shaul R. Foguel and United States. Air Force. Office of Scientific Research (page images at HathiTrust)
• Research study of Navier-Stokes equations ([Washington, D.C.] : Air Force Office of Scientific Research, United States Air Force, 1961., 1961), by G. Prodi, Universit©Ła degli studi di Trieste, and United States. Air Force. Office of Scientific Research (page images at HathiTrust)
• On the Lebesgue convergence theorem (Washington D. C. : mathematical Sciences Directorate, Office of Scientific Research, U.S. Air Force, 1960., 1960), by Arlen Brown and United States. Air Force. Office of Scientific Research (page images at HathiTrust)
• Classes of biorthonormal systems (Washington D. C. : Air Research and Development Command, Office of Scientific Research, U.S. Air Force, 1960., 1960), by Jacob Steinberg and United States. Air Force. Office of Scientific Research (page images at HathiTrust)

More items available under broader and related terms at left.