English

Indefinite theta series and generalized error functions

Number Theory 2020-11-20 v3 High Energy Physics - Theory Algebraic Geometry

Abstract

Theta series for lattices with indefinite signature (n+,n)(n_+,n_-) arise in many areas of mathematics including representation theory and enumerative algebraic geometry. Their modular properties are well understood in the Lorentzian case (n+=1n_+=1), but have remained obscure when n+2n_+\geq 2. 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 (n+=2n_+=2). As an application, we determine the modular properties of a generalized Appell-Lerch sum attached to the lattice A2A_2, which arose in the study of rank 3 vector bundles on P2\mathbb{P}^2. The extension of our method to n+>2n_+>2 is outlined.

Keywords

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)

R2 v1 2026-06-22T14:27:51.890Z