On the slice spectral sequence for quotients of norms of Real bordism

Abstract

In this paper, we investigate equivariant quotients of the Real bordism spectrum's multiplicative norm MU((C2n)) by permutation summands. These quotients are of interest because of their close relationship with higher real K-theories. We introduce new techniques for computing the equivariant homotopy groups of such quotients. As a new example, we examine the theories BP((C2n)) m,m. These spectra serve as natural equivariant generalizations of connective integral Morava K-theories. We provide a complete computation of the aσ-localized slice spectral sequence of i*C2n-1BP((C2n)) m,m, where σ is the real sign representation of C2n-1. To achieve this computation, we establish a correspondence between this localized slice spectral sequence and the HF2-based Adams spectral sequence in the category of HF2 HF2-modules. Furthermore, we provide a full computation of the aλ-localized slice spectral sequence of the height-4 theory BP((C4)) 2,2. The C4-slice spectral sequence can be entirely recovered from this computation.