A Quantum Invariant of Links in T2 × I with Volume Conjecture Behavior

Abstract

We define a polynomial invariant JnT of links in the thickened torus. We call JTn the nth toroidal colored Jones polynomial, and show it satisfies many properties of the original colored Jones polynomial. Most significantly, JnT exhibits volume conjecture behavior. We prove the volume conjecture for the 2-by-2 square weave, and provide computational evidence for other links. We also give two equivalent constructions of JnT, one as a generalized operator invariant we call a pseudo-operator invariant, and another using the Kauffman bracket skein module of the torus. Finally, we show JTn produces invariants of biperiodic and virtual links. To our knowledge, JTn gives the first example of volume conjecture behavior in a virtual (non-classical) link.