The Erdős--Moser equation 1k+2k+...+(m-1)k=mk revisited using continued fractions

Abstract

If the equation of the title has an integer solution with k2, then m>109.3·106. This was the current best result and proved using a method due to L. Moser (1953). This approach cannot be improved to reach the benchmark m>10107. Here we achieve m>10109 by showing that 2k/(2m-3) is a convergent of 2 and making an extensive continued fraction digits calculation of (2)/N, with N an appropriate integer. This method is very different from that of Moser. Indeed, our result seems to give one of very few instances where a large scale computation of a numerical constant has an application.