A wrapped Fukaya category of knot complement

Abstract

This is the first of a series of two articles where we construct a version of wrapped Fukaya category W F(M K;Hg0) of the cotangent bundle T*(M K) of the knot complement M K of a compact 3-manifold M, and do some calculation for the case of hyperbolic knots K ⊂ M. For the construction, we use the wrapping induced by the kinetic energy Hamiltonian Hg0 associated to the cylindrical adjustment g0 on M K of a smooth metric g defined on M. We then consider the torus T = ∂ N(K) as an object in this category and its wrapped Floer complex CW*(*T;Hg0) where N(K) is a tubular neighborhood of K ⊂ M. We prove that the quasi-equivalence class of the category and the quasi-isomorphism class of the A∞ algebra CW*(*T;Hg0) are independent of the choice of cylindrical adjustments of such metrics depending only on the isotopy class of the knot K in M. In a sequel [BKO], we give constructions of a wrapped Fukaya category W F(M K;Hh) for hyperbolic knot K and of A∞ algebra CW*(*T;Hh) directly using the hyperbolic metric h on M K, and prove a formality result for the asymptotic boundary of (M K, h).