Computational progress on the unfair 0-1 polynomial Conjecture
Abstract
Let be a monic integer polynomial with coefficients or . Write where and are monic polynomials with non-negative real (not necessarily integer) coefficients. The unfair 0--1 polynomial conjecture states that and are necessarily integer polynomials with coefficients or . Let be a candidate factor of a (currently unknown) 0--1 polynomial. We will assume that we know if a coefficient is , or strictly between and , but that we do not know the precise value of non-integer coefficients. Given this candidate , this paper gives an algorithm to either find a and with such that has non-negative real coefficients and has coefficients or , or (often) shows that no such and exist. Using this algorithm, we consider all candidate factors with degree less than or equal to 15. With the exception of 975 candidate factors (out of a possible 7141686 cases), this algorithm shows that there do not exist with non-negative real coefficients and with coefficients or such that .
Keywords
Cite
@article{arxiv.2307.07363,
title = {Computational progress on the unfair 0-1 polynomial Conjecture},
author = {Kevin G. Hare},
journal= {arXiv preprint arXiv:2307.07363},
year = {2023}
}