Large gaps between values of several binary quadratic forms

Abstract

In this paper we study the problem of long gaps between values of binary quadratic forms. Let D1, D2,… ,Dr be negative integers and (sn)n=1∞ be the sequence of all the numbers representable by any binary quadratic form of discriminant D1, D2, … or Dr, and let d := lcm\D1,… ,Dr\. We show that then align* n∞sn+1-sn sn≥ 1 d + d + d + 4. align* This improves and generalises a result by Dietmann, Elsholtz, Kalmynin, Konyagin, and Maynard. As a by-product of our preliminary results, we show an improvement to the P\'olya-Vinogradov inequality.