SU(2)-representations of Branched Covers

Abstract

We study the existence of irreducible SU(2)-representations for cyclic branched covers of knots in S3. Our main result establishes that if K is a non-trivial prime knot and d is an integer such that d ≥ 2 and d(K) is an integer homology sphere, then π1(d(K)) admits an irreducible SU(2)-representation, whenever K satisfies one of two conditions: either K is 2-periodic, or K can be represented as the closure of a tangle adapted to a d× d SICUP matrix. The first condition leverages a commuting trick for covering spaces to realize higher-degree branched covers as 2-fold covers, allowing us to apply recent results of Kronheimer-Mrowka and others. The second condition uses equivariant surgery descriptions and the invariant from instanton Floer homology. As applications, we provide new infinite families of hyperbolic integer homology spheres admitting irreducible representations, including examples where previously known criteria fail.