Comodules and Landweber exact homology theories |
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| Authors: | Mark Hovey Neil Strickland |
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| Affiliation: | a Department of Mathematics, Wesleyan University, Middletown, CT 06459, USA
b Department of Pure Mathematics, University of Sheffield, Sheffield S3 7RH, England UK |
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| Abstract: | We show that, if E is a commutative MU-algebra spectrum such that  is Landweber exact over  , then the category of  -comodules is equivalent to a localization of the category of  -comodules. This localization depends only on the heights of E at the integer primes p. It follows, for example, that the category of  -comodules is equivalent to the category of  -comodules. These equivalences give simple proofs and generalizations of the Miller-Ravenel and Morava change of rings theorems. We also deduce structural results about the category of  -comodules. We prove that every  -comodule has a primitive, we give a classification of invariant prime ideals in  , and we give a version of the Landweber filtration theorem. |
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| Keywords: | Hopf algebroid Comodule Landweber exact Localization Torsion theory Stable homotopy theory Brown-Peterson homology Johnson-Wilson homology Landweber filtration |
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