English

Polynomial Interpolation and Identity Testing from High Powers over Finite Fields

Number Theory 2015-02-25 v1 Data Structures and Algorithms

Abstract

We consider the problem of recovering (that is, interpolating) and identity testing of a "hidden" monic polynomial ff, given an oracle access to f(x)ef(x)^e for xFqx\in{\mathbb F_q} (extension fields access is not permitted). The naive interpolation algorithm needs O(edegf)O(e\, \mathrm{deg}\, f) queries and thus requires edegf<qe\, \mathrm{deg}\, f<q. We design algorithms that are asymptotically better in certain cases; requiring only eo(1)e^{o(1)} queries to the oracle. In the randomized (and quantum) setting, we give a substantially better interpolation algorithm, that requires only O(degflogq)O(\mathrm{deg}\, f \log q) queries. Such results have been known before only for the special case of a linear ff, called the hidden shifted power problem. We use techniques from algebra, such as effective versions of Hilbert's Nullstellensatz, and analytic number theory, such as results on the distribution of rational functions in subgroups and character sum estimates.

Keywords

Cite

@article{arxiv.1502.06631,
  title  = {Polynomial Interpolation and Identity Testing from High Powers over Finite Fields},
  author = {Gabor Ivanyos and Marek Karpinski and Miklos Santha and Nitin Saxena and Igor Shparlinski},
  journal= {arXiv preprint arXiv:1502.06631},
  year   = {2015}
}
R2 v1 2026-06-22T08:36:03.541Z