Indefinite theta series and generalized error functions
Abstract
Theta series for lattices with indefinite signature arise in many areas of mathematics including representation theory and enumerative algebraic geometry. Their modular properties are well understood in the Lorentzian case (), but have remained obscure when . Using a higher-dimensional generalization of the usual (complementary) error function, discovered in an independent physics project, we construct the modular completion of a class of `conformal' holomorphic theta series (). As an application, we determine the modular properties of a generalized Appell-Lerch sum attached to the lattice , which arose in the study of rank 3 vector bundles on . The extension of our method to is outlined.
Cite
@article{arxiv.1606.05495,
title = {Indefinite theta series and generalized error functions},
author = {Sergei Alexandrov and Sibasish Banerjee and Jan Manschot and Boris Pioline},
journal= {arXiv preprint arXiv:1606.05495},
year = {2020}
}
Comments
32 pages, 2 figures; v2: discussed $\Delta_{12}=0$ case at end of section 3, added subsection 4.4 on $C_1=C_2$ case (relevant for signature (2,1)), and added several references; v3: published version in Selecta Mathematica (with apologies for not uploading it earlier)