Perturbed Traceless SU(2) Character Varieties of Tangle Sums

Abstract

If a link L can be decomposed into the union of two tangles TS2 S along a 2-sphere intersecting L in 4 points, then the intersections of perturbed traceless SU(2) character varieties of tangles in a space called the pillowcase form a set of generators for Kronheimer and Mrowka's reduced singular instanton homology, I. It is conjectured by Cazassus, Herald, Kirk, and Kotelskiy that with the addition of bounding cochains, the differential of I can be recovered from these Lagrangians as well. This article gives a method to compute the perturbed character variety for a large class of tangles using cut-and-paste methods. In particular, given two tangles, T and S, Conway defines the tangle sum T+S. Given the character varieties of T and S, we show how to construct the perturbed character variety of T+S. This is done by first studying the perturbed character variety of a certain tangle C3 properly embedded in S3 with 3 balls removed. Using these results, we prove a nontriviality result for the bounding cochains in the conjecture of Cazassus, Herald, Kirk, and Kotelskiy.

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