Isolations of cubic lattices from their proper sublattices

Abstract

A (positive definite and integral) quadratic form is called an isolation of a quadratic form f if it represents all subforms of f except for f itself. The minimum rank of isolations of a quadratic form f is denoted, if it exists, by Iso(f). In this article, we show that Iso(I2)=5 and Iso(I3)=6, where In=x12+…+xn2 is the sum of n squares for any positive integer n. After proving that there always exists an isolation of In for any positive integer n, we provide some explicit lower and upper bounds for Iso(In). In particular, we show that Iso(In) ∈ (n32-ε) for any ε>0.