On Higher Topological T-duality Functors

Abstract

We use String Field Theory (SFT) to construct a higher analogue of Bunke-Schick's functor P: Topop Set BunkeS1 by geometrizing P. We use the projection of SFT onto its massless modes SFTDiffeo to construct the category whose objects are pairs (which we identify with SFT backgrounds) and whose maps are morphisms of pairs (which are gauge transformations). Using and categorical equivalence, for any CW-complex X we define the moduli space G(X) of SFT backgrounds which are pairs over X up to gauge equivalence. We use the homotopy theory of the moduli space G(X) to define functors on the category of CW-complexes Pk:CWop Grpd such that P0 P, P1 is nontrivial and Pk(X) are always trivial for k ≥ 2. Arrows in P1(X) are shown to be isotopy classes of maps in the mapping class group of X acting on (isomorphism classes of) pairs over X. We discuss applications to Topological T-duality for triples and to modelling doubled geometries and T-folds HullT.