Path components of G2-moduli spaces may be non-aspherical
Abstract
Starting from Joyce's generalised Kummer construction, we exhibit non-trivial families of G2-manifolds over the two dimensional sphere by resolving singularities with a twisted family of Eguchi-Hanson spaces. We establish that the comparison map G2tf(M) /\!\!/ Diff(M)0 → G2tf(M) / Diff(M)0 is a fibration over each path components with Eilenberg Mac Lane spaces as fibres, which allows us to show that these families remain non-trivial in G2tf(M) / Diff(M)0. In addition, we construct a new invariant based on characteristic classes that allows us to show that different resolutions give rise to different elements in the moduli space.
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