Chromatic phenomena in the algebra of BP*BP-comodules

Abstract

This paper begins with an exposition of the author's research on the category of BP*BP-comodules, much of which is joint with Neil Strickland. The main result of that work is that the category of E(n)*E(n)-comodules is equivalent to a localization of the category of BP*BP-comodules (the localization is Ln, analogous to the topological Ln). The main new result in this paper is that, analogously, the stable homotopy category of E(n)*E(n)-comodules is equivalent to a localization (the finite localization Lnf this time, not Ln) of the stable homotopy category of BP*BP-comodules. These stable homotopy categories were constructed in previous work of the author, and are supposed to model stable homotopy theory; it is like stable homotopy theory where there are no differentials in the Adams-Novikov spectral sequence. Our result embeds the Miller-Ravenel and Hovey-Sadofsky change of rings theorems as special cases of more general isomorphisms.

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