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

In this paper, we study equivariant quotients of the multiplicative norm $MU^{((C_{2^n}))}$ of the Real bordism spectrum by permutation summands, a concept defined here. These quotients are interesting because of their relationship to the so-called "higher real $K$-theories". We provide new tools for computing the equivariant homotopy groups of such quotients of $MU^{((C_{2^n}))}$ and quotients of the closely related spectrum $BP^{((C_{2^n}))}$. As a new example, we study spectra denoted by $BP^{((C_{2^n}))}\langle m,m\rangle$, which have non-trivial chromatic localizations only at heights equal to $rm$ where $0\leq r\leq 2^{n-1}$. These spectra are natural equivariant generalizations of integral Morava-$K$-theories. For $\sigma$ the real sign representation of $C_{2^{n-1}}$, we give a complete computation of the $a_{\sigma}$-localized slice spectral sequence of $i^*_{C_{2^{n-1}}}BP^{((C_{2^n}))}\langle m,m\rangle$. We do this by establishing a correspondence between this localized slice spectral sequence and the $H\mathbb{F}_2$-based Adams spectral sequence in the category of $H\mathbb{F}_2 \wedge H\mathbb{F}_2$-modules. We also give a complete computation of the $a_{\lambda}$-localized slice spectral sequence of $BP^{((C_{4}))}\langle 2,2\rangle$ for $\lambda$ a rotation of $\mathbb{R}^2$ by an angle of $\pi/2$. The non-localized slice spectral sequences can be recovered completely from these localizations.