Instanton Counting and Donaldson-Thomas Theory on Toric Calabi-Yau Four-Orbifolds

Abstract

We study rank r cohomological Donaldson-Thomas theory on a toric Calabi-Yau orbifold of C4 by a finite abelian subgroup of SU(4), from the perspective of instanton counting in cohomological gauge theory on a noncommutative crepant resolution of the quotient singularity. We describe the moduli space of noncommutative instantons on C4/ and its generalized ADHM parametrization. Using toric localization, we compute the orbifold instanton partition function as a combinatorial series over r-vectors of -coloured solid partitions. When the -action fixes an affine line in C4, we exhibit the dimensional reduction to rank r Donaldson-Thomas theory on the toric Kahler three-orbifold C3/. Based on this reduction and explicit calculations, we conjecture closed infinite product formulas, in terms of generalized MacMahon functions, for the instanton partition functions on the orbifolds C2/Zn×C2 and C3/(Z2×Z2)×C, finding perfect agreement with new mathematical results of Cao, Kool and Monavari.