On the Steenrod module structure of R-motivic Spanier-Whitehead duals
Abstract
The R-motivic cohomology of an R-motivic spectrum is a module over the R-motivic Steenrod algebra AR. In this paper, we describe how to recover the R-motivic cohomology of the Spanier-Whitehead dual DX of an R-motivic finite complex X, as an AR-module, given the AR-module structure on the cohomology of X. As an application, we show that 16 out of 128 different AR-module structures on AR(1):= Sq1, Sq2 are self-dual.
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