Includes bibliographical references (pages 455-457) and index.
Sets, numbers, and cardinals -- Metric spaces: definition, examples, and basics -- Topological spaces: definition and examples -- Subspaces, quotient spaces, manifolds, and CW-complexes -- Products of spaces -- Connected spaces and path connected spaces -- Compactness and related matters -- Separation properties -- Urysohn, Tietze, and Stone-Čech -- Isotopy and homotopy -- The fundamental group of a circle and applications -- Combinatorial group theory -- Seifert-van Kampen theorem and applications -- On classifying manifolds and related topics -- Covering spaces, part 1 -- Covering spaces, part 2 -- Applications in group theory