C2-Equivariant Orthogonal Calculus

Abstract

In this thesis, we construct a new version of orthogonal calculus for functors F from C2-representations to C2-spaces, where C2 is the cyclic group of order 2. For example, the functor BO(-), which sends a C2-representation V to the classifying space of its orthogonal group BO(V). We obtain a bigraded sequence of approximations to F, called the strongly (p,q)-polynomial approximations Tp,qF. The bigrading arises from the bigrading on C2-representations. The homotopy fibre Dp,qF of the map from Tp+1,qTp,q+1F to Tp,qF is such that the approximation Tp+1,qTp,q+1Dp,qF is equivalent to the functor Dp,qF itself and the approximation Tp,qDp,qF is trivial. A functor with these properties is called (p,q)-homogeneous. Via a zig-zag of Quillen equivalences, we prove that (p,q)-homogeneous functors are fully determined by orthogonal spectra with a genuine action of C2 and a naive action of the orthogonal group O(p,q).