This book offers a thorough introduction to the important topics of topology, a variety of interesting, concrete examples, and ample opportunity and guidance for building reasoning skills and writing proofs. It uses a unique, less-abstract, more example-driven approach that uses the setting of Euclidean space — mostly the line, the plane and 3-dimensional space. Focuses on Rn. Covers: Open and Closed Subsets; Building Open and Closed Subsets; Continuity; Homeomorphism; Cantor Sets and Similar Constructions; Embeddings; Connectivity; Path Connectedness; Closure, Limit Points, and Limit Points of Sequences; Compactness; Local Connectivity; Space Filling Curves; Manifolds; Simple Connectivity; Deformation Type; Knots and Knottings; Complexes; Higher Dimensions; and The Poincare “Conjecture.” For anyone who needs an introduction to topology.
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Book Description Pearson, 1999. Paperback. Book Condition: New. book. Bookseller Inventory # M0138638799
Book Description Pearson, 1999. Paperback. Book Condition: New. 1. Bookseller Inventory # DADAX0138638799
Book Description Pearson, 1999. Paperback. Book Condition: New. Bookseller Inventory # P110138638799