Evaluation of the convolution sums Σl+15m=n σ(l) σ(m) and Σ3l+5m=n σ(l) σ(m) and some applications

Abstract

We evaluate the convolution sums Σl,m∈ N, l+15m=n σ(l) σ(m) and Σl,m∈ N, 3l+5m=n σ(l) σ(m) for all n∈ N using the theory of quasimodular forms and use these convolution sums to determine the number of representations of a positive integer n by the form x12 + x1x2 + x22 + x32 + x3x4 + x42 + 5 (x52 + x5x6 + x62 + x72 + x7x8 + x82). We also determine the number of representations of positive integers by the quadratic form x12 + x22+x32+x42 + 6 (x52+x62+x72+x82), by using the convolution sums obtained earlier by Alaca, Alaca and Williams aw3, aw4.