English

Degree-$d$ Chow Parameters Robustly Determine Degree-$d$ PTFs (and Algorithmic Applications)

Machine Learning 2018-11-09 v1 Computational Complexity Data Structures and Algorithms Machine Learning

Abstract

The degree-dd Chow parameters of a Boolean function f:{1,1}nRf: \{-1,1\}^n \to \mathbb{R} are its degree at most dd Fourier coefficients. It is well-known that degree-dd Chow parameters uniquely characterize degree-dd polynomial threshold functions (PTFs) within the space of all bounded functions. In this paper, we prove a robust version of this theorem: For ff any Boolean degree-dd PTF and gg any bounded function, if the degree-dd Chow parameters of ff are close to the degree-dd Chow parameters of gg in 2\ell_2-norm, then ff is close to gg in 1\ell_1-distance. Notably, our bound relating the two distances is completely independent of the dimension nn. That is, we show that Boolean degree-dd PTFs are {\em robustly identifiable} from their degree-dd Chow parameters. Results of this form had been shown for the d=1d=1 case~\cite{OS11:chow, DeDFS14}, but no non-trivial bound was previously known for d>1d >1. Our robust identifiability result gives the following algorithmic applications: First, we show that Boolean degree-dd PTFs can be efficiently approximately reconstructed from approximations to their degree-dd Chow parameters. This immediately implies that degree-dd PTFs are efficiently learnable in the uniform distribution dd-RFA model~\cite{BenDavidDichterman:98}. As a byproduct of our approach, we also obtain the first low integer-weight approximations of degree-dd PTFs, for d>1d>1. As our second application, our robust identifiability result gives the first efficient algorithm, with dimension-independent error guarantees, for malicious learning of Boolean degree-dd PTFs under the uniform distribution.

Keywords

Cite

@article{arxiv.1811.03491,
  title  = {Degree-$d$ Chow Parameters Robustly Determine Degree-$d$ PTFs (and Algorithmic Applications)},
  author = {Ilias Diakonikolas and Daniel M. Kane},
  journal= {arXiv preprint arXiv:1811.03491},
  year   = {2018}
}
R2 v1 2026-06-23T05:09:10.369Z