Algebraic redshift in the C2-equivariant Adams spectral sequence

Abstract

We study vn-periodic phenomena in C2-equivariant stable homotopy through the lens of the C2-equivariant Adams spectral sequence at the prime 2. In particular, we construct/detect certain classes related to powers of the vn generators of π*(BP) in the cohomology of certain finitely generated subalgebras AC2(m) of the C2-equivariant Steenrod algebra. We define the notion of classes in ExtAC2(H, H) being vn-periodic or vn-torsion and exhibit a chromatic filtration by showing that vn-torsion classes are also vk-torsion for 0 k < n. We also promote the Lin-Davis-Mahowald-Adams splitting of Ext of the suitable version of ``R P-∞∞" to the C2-equivariant setting and use this to define appropriate algebraic versions of Mahowald's root invariant. We establish that whenever a class corresponding to a power of vn is nonzero in ExtAC2(m)(H, H), then the same power of vn-1 is also nonzero in ExtAC2(m-1)(H, H), and its algebraic Mahowald invariant MmC2-alg(vn-12f) ⊂ ExtAC2(m)(H, H) contains class(es) corresponding to vn2f. Real motivic versions of these results hold as well.