A Cartan-Eilenberg spectral sequence for a non-normal extension

Abstract

Let be a conormal extension of Hopf algebras over a commutative ring k, and let M be a -comodule. The Cartan-Eilenberg spectral sequence E2 = Ext(k,Ext(k,M)) Ext(k,M) is a standard tool for computing the Hopf algebra cohomology of with coefficients in M in terms of the cohomology of the pieces and . Bruner and Rognes, generalizing a construction of Davis and Mahowald, have introduced a generalization of the Cartan-Eilenberg spectral sequence converging to Ext(k,M) that can be defined when = k is compatibly an algebra and a -comodule. We offer a concrete cobar-like construction that fits into their framework, and show how this work fits into a larger story. In particular, we show that this spectral sequence is isomorphic, starting at the E1 page, to both the Adams spectral sequence in the stable category of -comodules as studied by Margolis and Palmieri, and to a filtration spectral sequence on the cobar complex for originally due to Adams. We obtain a description of the E2 term under an additional flatness assumption. We discuss applications to computing localizations of the Adams spectral sequence E2 page.