Sparse Interpolation With Errors in Chebyshev Basis Beyond Redundant-Block Decoding
Abstract
We present sparse interpolation algorithms for recovering a polynomial with terms from evaluations at distinct values for the variable when of the evaluations can be erroneous. Our algorithms perform exact arithmetic in the field of scalars and the terms can be standard powers of the variable or Chebyshev polynomials, in which case the characteristic of is . Our algorithms return a list of valid sparse interpolants for the support points and run in polynomial-time. For standard power basis our algorithms sample at points, which are fewer points than given by Kaltofen and Pernet in 2014. For Chebyshev basis our algorithms sample at points, which are also fewer than the number of points required by the algorithm given by Arnold and Kaltofen in 2015, which has for and . Our method shows how to correct errors in a block of points for standard basis and how to correct error in a block of points for Chebyshev Basis.
Keywords
Cite
@article{arxiv.1912.05719,
title = {Sparse Interpolation With Errors in Chebyshev Basis Beyond Redundant-Block Decoding},
author = {Erich L. Kaltofen and Zhi-Hong Yang},
journal= {arXiv preprint arXiv:1912.05719},
year = {2020}
}
Comments
in IEEE Transactions on Information Theory