Higher algebra of A∞ and B As-algebras in Morse theory II

Abstract

This paper introduces the notion of n-morphisms between two A∞-algebras, such that 0-morphisms correspond to standard A∞-morphisms and 1-morphisms correspond to A∞-homotopies between A∞-morphisms. The set of higher morphisms between two A∞-algebras then defines a simplicial set which has the property of being an algebraic ∞-category. The operadic structure of n-A∞-morphisms is also encoded by new families of polytopes, which we call the n-multiplihedra and which generalize the standard multiplihedra. These are constructed from the standard simplices and multiplihedra by lifting the Alexander-Whitney map to the level of simplices. Rich combinatorics arise in this context, as conveniently described in terms of overlapping partitions. Shifting from the A∞ to the B As framework, we define the analogous notion of n-morphisms between B As-algebras, which are again encoded by the n-multiplihedra, endowed with a refined cell decomposition by stable gauged ribbon tree type. We then realize this higher algebra of A∞ and B As-algebras in Morse theory. Given two Morse functions f and g, we construct n- B As-morphisms between their respective Morse cochain complexes endowed with their B As-algebra structures, by counting perturbed Morse gradient trees associated to an admissible simplex of perturbation data. We moreover show that the simplicial set consisting of higher morphisms defined by a count of perturbed Morse gradient trees is a contractible Kan complex.