Coloring invariants of knots and links are often intractable

Abstract

Let G be a nonabelian, simple group with a nontrivial conjugacy class C ⊂eq G. Let K be a diagram of an oriented knot in S3, thought of as computational input. We show that for each such G and C, the problem of counting homomorphisms π1(S3 K) G that send meridians of K to C is almost parsimoniously \#P-complete. This work is a sequel to a previous result by the authors that counting homomorphisms from fundamental groups of integer homology 3-spheres to G is almost parsimoniously \#P-complete. Where we previously used mapping class groups actions on closed, unmarked surfaces, we now use braid group actions.