On the Sum of Squarefree Integers and a Power of Two

Abstract

Erdos conjectured that every odd number greater than one can be expressed as the sum of a squarefree number and a power of two. Subsequently, Odlyzko and McCranie provided numerical verification of this conjecture up to 107 and 1.4· 109. In this paper, we extend the verification to all odd integers up to 250, thereby improving the previous bound by a factor of more than 8· 105. Our approach employs a highly parallelized algorithm implemented on a GPU, which significantly accelerates the process. We provide details of the algorithm and present novel heuristic computations and numerical findings, including the smallest odd numbers <250 that require a higher power of two as all smaller ones in their representation.

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