A proof of Kontsevich-Soibelman conjecture

Abstract

It is well known that "Fukaya category" is in fact an A∞-pre-category in sense of Kontsevich and Soibelman KS. The reason is that in general the morphism spaces are defined only for transversal pairs of Lagrangians, and higher products are defined only for transversal sequences of Lagrangians. In KS it is conjectured that for any graded commutative ring k, quasi-equivalence classes of A∞-pre-categories over k are in bijection with quasi-equivalence classes of A∞-categories over k with strict (or weak) identity morphisms. In this paper we prove this conjecture for essentially small A∞-(pre-)categories, in the case when k is a field. In particular, it follows that we can replace Fukaya A∞-pre-category with a quasi-equivalent actual A∞-category. We also present natural construction of pre-triangulated envelope in the framework of A∞-pre-categories. We prove its invariance under quasi-equivalences.