Knots with large character varieties

Abstract

We study knots whose SL2(C)-character varieties have a component of dimension greater than one. We call such knots X-large and introduce two diagrammatic constructions that produce X-large knots. The first construction uses split link diagrams and rational tangle replacements, providing a topological explanation for most X-large knots observed in knot tables. The second construction is based on braids and orientation-reversing involutions, and is motivated by a detailed analysis of the knot 10123, also known as the Turk's head knot Th(3,5). In particular, this approach applies to Turk's head knots Th(p,q) with p and q odd, leading us to conjecture that all such knots are X-large. In doing so, we also present a non-orientable analogue of Thurston's theorem giving a lower bound on the dimension of character varieties of non-orientable 3-manifolds.