Tetrahedron Instantons on Orbifolds

Abstract

Given a homomorphism τ from a suitable finite group to SU(4) with image τ, we construct a cohomological gauge theory on a noncommutative resolution of the quotient singularity C4/τ whose BRST fixed points are -invariant tetrahedron instantons on a generally non-effective orbifold. The partition function computes the expectation values of complex codimension one defect operators in rank r cohomological Donaldson-Thomas theory on a flat gerbe over the quotient stack [C4/\,τ]. We describe the generalized ADHM parametrization of the tetrahedron instanton moduli space, and evaluate the orbifold partition functions through virtual torus localization. If is an abelian group the partition function is expressed as a combinatorial series over arrays of -coloured plane partitions, while if is non-abelian the partition function localizes onto a sum over torus-invariant connected components of the moduli space labelled by lower-dimensional partitions. When =Zn is a finite abelian subgroup of SL(2,C), we exhibit the reduction of Donaldson-Thomas theory on the toric Calabi-Yau four-orbifold C2/\,×C2 to the cohomological field theory of tetrahedron instantons, from which we express the partition function as a closed infinite product formula. We also use the crepant resolution correpondence to derive a closed formula for the partition function on any polyhedral singularity.

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