Introduction 1. Basic definitions 2. $E$ Theory 3. $K$-Injective spectra 4. Generalised Moore spectra 5. Bousfield classes 6. The $E$($n$)-local category 7. General properties of the $K$($n$)-local category 8. Smallness and duality 9. Homology and cohomology functors 10. Brown-Comenetz duality 11. The natural topology 12. Dualisable spectra 13. $K$-Nilpotent spectra 14. Grading over the Picard group 15. Examples 16. Questions and conjectures
Notes
"May 1999, volume 139, number 666 (end of volume)."
Bibliography
Includes bibliographical references (pages 96-98) and index