Fast Evaluation of Real and Complex Polynomials
Abstract
We propose an algorithm for quickly evaluating polynomials. It pre-conditions a complex polynomial of degree in time , with a low multiplicative constant independent of the precision. Subsequent evaluations of computed with a fixed precision of bits are performed in average arithmetic complexity and memory . The average complexity is computed with respect to points , weighted by the spherical area of . The worst case does not exceed the complexity of H{\"o}rner's scheme. In particular, our algorithm performs asymptotically as per evaluation. For many classes of polynomials, in particular those with random coefficients in a bounded region of , or for sparse polynomials, our algorithm performs much better than this upper bound, without any modification or parameterization.The article contains a detailed analysis of the complexity and a full error analysis, which guarantees that the algorithm performs as well as H\''orner's scheme, only faster. Our algorithm is implemented in a companion library, written in standard C and released as an open-source project [MV22].Our claims regarding complexity and accuracy are confirmed in practice by a set of comprehensive benchmarks.
Cite
@article{arxiv.2211.06320,
title = {Fast Evaluation of Real and Complex Polynomials},
author = {Ramona Anton and Nicolae Mihalache and François Vigneron},
journal= {arXiv preprint arXiv:2211.06320},
year = {2022}
}