Real topological cyclic homology of spherical group rings

Abstract

We compute the G-equivariant homotopy type of the real topological cyclic homology of spherical group rings with anti-involution induced by taking inverses in the group, where G denotes the group Gal(C/R). The real topological Hochschild homology of a spherical group ring S[], with anti-involution as described, is an O(2)-cyclotomic spectrum and we construct a map commuting with the cyclotomic structures from the O(2)-equivariant suspension spectrum of the dihedral bar construction on to the real topological Hochschild homology of S[], which induce isomorphisms on Cpn- and Dpn-homotopy groups for all n∈ Z and all primes p. Here Cpn is the cyclic group of order pn and Dpn is the dihedral group of order 2pn. Finally, we compute the G-equivariant homotopy type of the real topological cyclic homology of S[] at a prime p.