Knots, Perturbative Series and Quantum Modularity

Abstract

We introduce an invariant of a hyperbolic knot which is a map α α(h) from Q/Z to matrices with entries in Q[[h]] and with rows and columns indexed by the boundary parabolic SL2(C) representations of the fundamental group of the knot. These matrix invariants have a rich structure: (a) their (σ0,σ1) entry, where σ0 is the trivial and σ1 the geometric representation, is the power series expansion of the Kashaev invariant of the knot around the root of unity e2π i α as an element of the Habiro ring, and the remaining entries belong to generalized Habiro rings of number fields; (b) the first column is given by the perturbative power series of Dimofte-Garoufalidis; (c) the columns of are fundamental solutions of a linear q-difference equation; (d) the matrix defines an SL2(Z)-cocycle Wγ in matrix-valued functions on Q that conjecturally extends to a smooth function on R and even to holomorphic functions on suitable complex cut planes, lifting the factorially divergent series (h) to actual functions. The two invariants and Wγ are related by a refined quantum modularity conjecture which we illustrate in detail for the three simplest hyperbolic knots, the 41, 52 and (-2,3,7) pretzel knots. This paper has two sequels, one giving a different realization of our invariant as a matrix of convergent q-series with integer coefficients and the other studying its Habiro-like arithmetic properties in more depth.