On realizations of the subalgebra AR(1) of the R-motivic Steenrod Algebra

Abstract

In this paper, we show that the finite subalgebra AR(1), generated by Sq1 and Sq2, of the R-motivic Steenrod algebra AR can be given 128 different AR-module structures. We also show that all of these AR-modules can be realized as the cohomology of a 2-local finite R-motivic spectrum. The realization results are obtained using an R -motivic analogue of the Toda realization theorem. We notice that each realization of AR(1) can be expressed as a cofiber of an R-motivic v1-self-map. The C2-equivariant analogue of the above results then follows because of the Betti realization functor. We identify a relationship between the RO(C2)-graded Steenrod operations on a C2-equivariant space and the classical Steenrod operations on both its underlying space and its fixed-points. This technique is then used to identify the geometric fixed-point spectra of the C2-equivariant realizations of AC2(1). We find another application of the R-motivic Toda realization theorem: we produce an R-motivic, and consequently a C2-equivariant, analogue of the Bhattacharya-Egger spectrum Z, which could be of independent interest.

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