The holonomy Lie ∞-groupoid of a singular foliation I

Abstract

We construct a finite-dimensional higher Lie groupoid integrating a singular foliation F, under the mild assumption that the latter admits a geometric resolution. More precisely, a recursive use of bi-submersions, a tool coming from non-commutative geometry and invented by Androulidakis and Skandalis, allows us to integrate any universal Lie ∞-algebroid of a singular foliation to a Kan simplicial manifold, where all components are made of non-connected manifolds which are all the same finite dimension that can be chosen to be equal to the ranks of a given geometric resolution. Its 1-truncation is the Androulidakis-Skandalis holonomy groupoid.

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