Membranes and Sheaves
Abstract
Our goal in this paper is to discuss a conjectural correspondence between enumerative geometry of curves in Calabi-Yau 5-folds and 1-dimensional sheaves on 3-folds that are embedded in as fixed points of certain -actions. In both cases, the enumerative information is taken in equivariant -theory, where the equivariance is with respect to all automorphisms of the problem. In Donaldson-Thomas theories, one sums up over all Euler characteristics with a weight , where is a parameter, informally referred to as the boxcounting parameter. The main feature of the correspondence is that the 3-dimensional boxcounting parameter becomes in dimensions the equivariant parameter for the -action that defines inside . The 5-dimensional theory effectively sums up the -expansion in the Donaldson-Thomas theory. In particular, it gives a natural explanation of the rationality (in ) of the DT partition functions. Other expected as well as unexpected symmetries of the DT counts follow naturally from the 5-dimensional perspective. These involve choosing different -actions on the same , and thus relating the same 5-dimensional theory to different DT problems. The important special case is considered in detail in Sections 7 and 8. If is a toric Calabi-Yau threefold, we compute the theory in terms of a certain index vertex. We show the refined vertex found combinatorially by Iqbal, Kozcaz, and Vafa is a special case of the index vertex.
Cite
@article{arxiv.1404.2323,
title = {Membranes and Sheaves},
author = {Nikita Nekrasov and Andrei Okounkov},
journal= {arXiv preprint arXiv:1404.2323},
year = {2014}
}
Comments
77 pages, 5 figures