'The purpose of the book under review is to give an expanded and systematic development of the part of equivariant stable homotopy theory required by readers wishing to understand the proof of the Kervaire Invariant Theorem. The book fully achieves this design aim. The book ends with a 130-page summary of the proof of the theorem, and having this as a target shapes the entire narrative.' J. P. C. Greenlees, MathSciNet

1. Introduction; Part I. The Categorical Tool Box: 2. Some Categorical Tools; 3. Enriched Category Theory; 4. Quillen's Theory of Model Categories; 5. Model Category Theory Since Quillen; 6. Bousfield Localization; Part II. Setting Up Equivariant Stable Homotopy Theory: 7. Spectra and Stable Homotopy Theory; 8. Equivariant Homotopy Theory; 9. Orthogonal G-spectra; 10. Multiplicative Properties of G-spectra; Part III. Proving the Kervaire Invariant Theorem: 11. The Slice Filtration and Slice Spectral Sequence; 12. The Construction and Properties of $MU_{\R}$; 13. The Proofs of the Gap, Periodicity and Detection Theorems; References; Table of Notation; Index.