A holomorphic and background independent partition function for matrix models and topological strings
Abstract
We study various properties of a nonperturbative partition function which can be associated to any spectral curve. When the spectral curve arises from a matrix model, this nonperturbative partition function is given by a sum of matrix integrals over all possible filling fractions, and includes all the multi-instanton corrections to the perturbative 1/N expansion. We show that the nonperturbative partition function, which is manifestly holomorphic, is also modular and background independent: it transforms as the partition function of a twisted fermion on the spectral curve. Therefore, modularity is restored by nonperturbative corrections. We also show that this nonperturbative partition function obeys the Hirota equation and provides a natural nonperturbative completion for topological string theory on local Calabi-Yau threefolds.
Cite
@article{arxiv.0810.4273,
title = {A holomorphic and background independent partition function for matrix models and topological strings},
author = {Bertrand Eynard and Marcos Marino},
journal= {arXiv preprint arXiv:0810.4273},
year = {2011}
}
Comments
40 pages, 11 figures, added reference and additional results on background independence