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Products in Topology |  | |  | Point Set Topology
by Steven A. Gaal
Suitable for a complete course in topology, this text also functions as a self-contained treatment for independent study. Additional enrichment materials make it equally valuable as a reference. 1964 edition.
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|  | Set Topology
by R. Vaidyanathaswamy
This introductory text covers the algebra of subsets and of rings and fields of sets, complementation and ideal theory in the distributive lattice, closure function, neighborhood topology, much more. Includes numerous exercises. 1960 edition.
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|  | Shape Theory: Categorical Methods of Approximation
by J. M. Cordier, T. Porter
This in-depth treatment uses shape theory as a "case study" to illustrate situations common to many areas of mathematics, including the use of archetypal models as a basis for systems of approximations. 1989 edition.
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|  | Topological Methods in Euclidean Spaces
by Gregory L. Naber
Extensive development of such topics as elementary combinatorial techniques, Sperner's Lemma, the Brouwer Fixed Point Theorem, and the Stone-Weierstrass Theorem. New section of solutions to selected problems.
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| |  | Topological Vector Spaces, Distributions and Kernels
by Francois Treves
Extending beyond the boundaries of Hilbert and Banach space theory, this text focuses on key aspects of functional analysis, particularly in regard to solving partial differential equations. 1967 edition.
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|  | Topology
by John G. Hocking, Gail S. Young
Superb one-year course in classical topology. Topological spaces and functions, point-set topology, much more. Examples and problems. Bibliography. Index.
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|  | Topology and Geometry for Physicists
by Charles Nash, Siddhartha Sen
Written by physicists for physics students, this text assumes no detailed background in topology or geometry. Topics include differential forms, homotopy, homology, cohomology, fiber bundles, connection and covariant derivatives, and Morse theory. 1983 edition.
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|  | Topology for Analysis
by Albert Wilansky
Three levels of examples and problems make this volume appropriate for students and professionals. Abundant exercises, ordered and numbered by degree of difficulty, illustrate important topological concepts. 1970 edition.
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|  | Topology of 3-Manifolds and Related Topics
by M.K. Fort, Jr., Daniel Silver
Summaries and full reports from a 1961 conference discuss decompositions and subsets of 3-space; n-manifolds; knot theory; the Poincaré conjecture; and periodic maps and isotopies. Familiarity with algebraic topology required. 1962 edition.
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| |  | Topology: An Introduction with Application to Topological Groups
by George McCarty
This introduction employs the language of point set topology to define and discuss topological groups. Covers set-theoretic topology and its applications as well as homotopy and the fundamental group. 1967 edition. Includes 99 illustrations.
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|  | Topology: An Introduction with Application to Topological Groups
by George McCarty
Covers sets and functions, groups, metric spaces, topologies, topological groups, compactness and connectedness, function spaces, the fundamental group, the fundamental group of the circle, locally isomorphic groups, more. 1967 edition.
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|  | Undergraduate Topology
by Robert H. Kasriel
This introductory treatment is essentially self-contained and features explanations and proofs that relate to every practical aspect of point set topology. Hundreds of exercises appear throughout the text. 1971 edition.
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