A modern, example-driven introduction to cubical diagrams and related topics such as homotopy limits and cosimplicial spaces.

Brian A. Munson is an Assistant Professor of Mathematics at the US Naval Academy. He has held postdoctoral and visiting positions at Stanford University, Harvard University, and Wellesley College, Massachusetts. His research area is algebraic topology, and his work spans topics such as embedding theory, knot theory, and homotopy theory.

Preface; Part I. Cubical Diagrams: 1. Preliminaries; 2. 1-cubes: homotopy fibers and cofibers; 3. 2-cubes: homotopy pullbacks and pushouts; 4. 2-cubes: the Blakers-Massey Theorems; 5. n-cubes: generalized homotopy pullbacks and pushouts; 6. The Blakers¿Massey Theorems for n-cubes; Part II. Generalizations, Related Topics, and Applications: 7. Some category theory; 8. Homotopy limits and colimits of diagrams of spaces; 9. Cosimplicial spaces; 10. Applications; Appendix; References; Index.