Canonical torsion linking pairings and explicit TMF state spaces of closed 3-manifolds

Abstract

We study the TMF-valued (3+1)-dimensional TQFT of Gukov--Krushkal--Meier--Pei and give an explicit description of the TMF-module state space assigned to a closed 3-manifold. Our starting point is the torsion linking pairing on H1, viewed as a discriminant form. We construct a canonical, computable package of invariants for torsion linking pairings (uniformly for odd and 2-primary parts), and from it a canonical tokenization together with an explicit symmetric integral matrix representative realizing the same stable class. This yields an explicit model for the GKMP state space in terms of a rank-one TMF-module Lb with a canonical degree shift determined by signature data. As applications we identify the values on CP2 and, conditional on a natural functoriality/duality statement in GKMP, on S2× S2 with the Hopf elements and η, respectively. Finally, we establish a rank-one time-reversal duality L(-n) L(n)[1] for all integers n.