An R-motivic v1-self-map of periodicity 1

Abstract

We consider a nontrivial action of C2 on the type 1 spectrum Y := M2(1) C(η), which is well-known for admitting a 1-periodic v1-self-map. The resultant finite C2-equivariant spectrum YC2 can also be viewed as the complex points of a finite R-motivic spectrum YR. In this paper, we show that one of the 1-periodic v1-self-maps of Y can be lifted to a self-map of YC2 as well as YR. Further, the cofiber of the self-map of YR is a realization of the subalgebra AR(1) of the R-motivic Steenrod algebra. We also show that the C2-equivariant self-map is nilpotent on the geometric fixed-points of YC2.