K-framings and K-quadratic forms on surfaces

Abstract

We introduce the notions of K-framings, based K-framings and relative K-framings of a compact connected oriented surface Σ for any commutative ring K with unit, and a map which maps a based loop on Σ to a homology class of its unit tangent bundle UΣ, which recovers Johnson's lifting in the case K = Z/2. This generalizes the correspondence between a quadratic form and a spin structure established by Johnson to any commutative ring K with unit. If the genus of Σ is positive, we have a bijection between the set of K-framings and the set of some twisted cocycles of the mapping class group of the surface Σ. Through this bijection, in the case where the boundary ∂Σ is non-empty and connected, we discuss some relation between K-framings and the extended first Johnson homomorphism.