Representations by x12+2x22+x32+x42+x1x3+x1x4+x2x4

Abstract

Let rQ(n) be the representation number of a nonnegative integer n by the quaternary quadratic form Q=x12+2x22+x32+x42+x1x3+x1x4+x2x4. We first prove the identity rQ(p2n)=rQ(p2)rQ(n)/rQ(1) for any prime p different from 13 and any positive integer n prime to p, which was conjectured in [Eum et al, A modularity criterion for Klein forms, with an application to modular forms of level 13, J. Math. Anal. Appl. 375 (2011), 28--41]. And, we explicitly determine a concise formula for the number rQ(n2) as well for any integer n.