The existence of instanton solutions to the R-invariant Kapustin-Witten equations on (0,∞)× R2× R

Abstract

A non-negative integer labeled set of model solutions to the R-invariant Kapustin-Witten equations on (0,∞)× R2× R plays a central role in Edward Witten's program to interpret the colored Jones polynomial or a knot in the context of SU(2) gauge theory. This paper explains why there are R-invariant solutions to these equations on (0,∞)× R2× R that interpolate between two model solutions as the (0,∞) parameter increases from 0 to ∞ while respecting the R2 factor asymptotics. The only constraint on the limiting pair of model solutions is this: Letting m0 and m∞ denote their non-negative integer labels, then m0 - m∞ must be a positive, even integer. (As explained in the paper, there is a C(m0 -m∞ - 2)/2× C* moduli space of these interpolation solutions.)