Classifying and extending Q0-local A(1)-modules

Abstract

In the stable category of bounded below A(1)--modules, every module is determined by an extension between a module with trivial Q0-Margolis homology and a module with trivial Q1-Margolis homology. We show that all bounded below A(1)-modules of finite type whose Q1-Margolis homology is trivial are stably equivalent to direct sums of suspensions of a distinguished family of A(1)-modules. Each module in this family is comprised of copies of A(1) /\!/ A(0) linked by the action of Sq1 ∈ A(1). The classification theorem is then used to simplify computations of h0-1ExtA(1), (-, F2) and to provide necessary conditions for lifting A(1)-modules to A-modules. We discuss a Davis--Mahowald spectral sequence converging to h0-1ExtA(1), (M, F2) where M is any bounded below A(1)-module. The differentials in this spectral sequence detect obstructions to lifting the A(1)-module, M, to an A-module. We give a formula for the second differential.