Orientability of moduli spaces of Spin(7)-instantons and coherent sheaves on Calabi–Yau 4-folds

Suppose (X,Ω,g) is a compact Spin(7)-manifold, e.g. a Riemannian 8-manifold with holonomy Spin(7), or a Calabi–Yau 4-fold. Let G be U(m) or SU(m), and P→X be a principal G-bundle. We show that the infinite-dimensional moduli space BP of all connections on P modulo gauge is orientable, in a certain s...

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Bibliographic Details
Published in:Advances in mathematics (New York. 1965) 2020-07, Vol.368, p.107134, Article 107134
Main Authors: Cao, Yalong, Gross, Jacob, Joyce, Dominic
Format: Article
Language:English
Subjects:
Calabi-Yau 4-fold
Donaldson-Thomas theory
Gauge theory
Moduli space
Orientation
Spin instanton
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Summary:Suppose (X,Ω,g) is a compact Spin(7)-manifold, e.g. a Riemannian 8-manifold with holonomy Spin(7), or a Calabi–Yau 4-fold. Let G be U(m) or SU(m), and P→X be a principal G-bundle. We show that the infinite-dimensional moduli space BP of all connections on P modulo gauge is orientable, in a certain sense. We deduce that the moduli space MPSpin(7)⊂BP of irreducible Spin(7)-instanton connections on P modulo gauge, as a manifold or derived manifold, is orientable. This improves theorems of Cao and Leung [9] and Muñoz and Shahbazi [42]. If X is a Calabi–Yau 4-fold, the derived moduli stack M of (complexes of) coherent sheaves on X is a −2-shifted symplectic derived stack (M,ω) by Pantev–Toën–Vaquié-Vezzosi [46], and so has a notion of orientation by Borisov–Joyce [7]. We prove that (M,ω) is orientable, by relating algebro-geometric orientations on (M,ω) to differential-geometric orientations on BP for U(m)-bundles P→X, and using orientability of BP. This has applications to defining Donaldson–Thomas type invariants counting semistable coherent sheaves on a Calabi–Yau 4-fold, as in Donaldson and Thomas [15], Cao and Leung [8], and Borisov and Joyce [7].
ISSN:0001-8708
1090-2082
DOI:10.1016/j.aim.2020.107134