Coupled G2-instantons

Abstract

We introduce the coupled instanton equations for a metric, a spinor, a three-form, and a connection on a bundle, over a spin manifold. Special solutions in dimensions 6 and 7 arise, respectively, from the Hull--Strominger and the heterotic G2 system. The equations are motivated by recent developments in theoretical physics and can be recast using generalized geometry; we investigate how coupled instantons relate to generalized Ricci-flat metrics and also to Killing spinors on a Courant algebroid. We present two open questions regarding how these different geometric conditions are intertwined, for which a positive answer is expected from recent developments in the physics literature by De la Ossa, Larfors and Svanes, and in the mathematics literature on Calabi--Yau manifolds, in recent work by the second-named author with Gonz\'alez Molina. We give a complete solution to the first of these problems, providing a new method for the construction of instantons in arbitrary dimensions. For G2-structures with torsion coupled to G2-instantons, in dimension 7, we also establish results around the second problem. The last part of the present work carefully studies the approximate solutions to the heterotic G2-system constructed by the third and fourth authors on contact Calabi--Yau 7-manifolds, for which we prove the existence of approximate coupled G2-instantons and generalized Ricci-flat metrics.

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