The eigensplitting of the fiber of the cyclotomic trace for the sphere spectrum

Abstract

Let p∈ Z be an odd prime. We show that the fiber sequence for the cyclotomic trace of the sphere spectrum S admits an "eigensplitting" that generalizes known splittings on K-theory and TC. We identify the summands in the fiber as the covers of Zp-Anderson duals of summands in the K(1)-localized algebraic K-theory of Z. Analogous results hold for the ring Z where we prove that the K(1)-localized fiber sequence is self-dual for Zp-Anderson duality, with the duality permuting the summands by i p-i (indexed mod p-1). We explain an intrinsic characterization of the summand we call Z in the splitting TC( Z)p j j' Z in terms of units in the p-cyclotomic tower of Qp.