Squaring operations in the RO(C2)-graded and real motivic Adams spectral sequences

Abstract

In this paper we establish a formula for computing d2(sqi(x)) where x is a permanent cycle in the C2-equivariant Adams spectral sequence or the motivic Adams spectral sequence over Spec(R). This requires establishing that the Adams towers have an H∞-structure as well as determining the attaching maps for C2-equivariant projective spaces. The attaching maps of C2-equivariant projective spaces can then be used to determine the coefficients of differentials in both the equivariant and motivic case. At the end some sample computations are given.