English

Tropical Varieties for Exponential Sums

Algebraic Geometry 2021-04-22 v4 Complex Variables Metric Geometry

Abstract

We study the complexity of approximating complex zero sets of certain nn-variate exponential sums. We show that the real part, RR, of such a zero set can be approximated by the (n1)(n-1)-dimensional skeleton, TT, of a polyhedral subdivision of Rn\mathbb{R}^n. In particular, we give an explicit upper bound on the Hausdorff distance: Δ(R,T)=O(t3.5/δ)\Delta(R,T) =O\left(t^{3.5}/\delta\right), where tt and δ\delta are respectively the number of terms and the minimal spacing of the frequencies of gg. On the side of computational complexity, we show that even the n=2n=2 case of the membership problem for RR is undecidable in the Blum-Shub-Smale model over R\mathbb{R}, whereas membership and distance queries for our polyhedral approximation TT can be decided in polynomial-time for any fixed nn.

Keywords

Cite

@article{arxiv.1412.4423,
  title  = {Tropical Varieties for Exponential Sums},
  author = {Alperen Ergür and Grigoris Paouris and J. Maurice Rojas},
  journal= {arXiv preprint arXiv:1412.4423},
  year   = {2021}
}

Comments

18 pages, 3 figures. This version corrects an erroneous proof of Theorem 1.1, and a small typo in Assertion (3) of Theorem 1.5, in the published version

R2 v1 2026-06-22T07:30:56.484Z