Generalized polygonal number representations

Abstract

Let rnk(N) be the number of representations of N as the sum of n generalized k-gonal numbers and rn(N) be the number of representations of N as the sum of n squares. By modifying the Heath-Brown circle method, we prove a closed-form asymptotic relation between rnk(N) and rn(8(k-2)N+n(k-4)2) for any k≥3 and any n≥4. Consequently, we determine the asymptotics of ΣN≤ xr4k(N)2 and, via a result of Bringmann, Jang, Kane, and Tse, prove a similar closed-form asymptotic relation between the number r4,+k(N) of representations of N as the sum of four ordinary k-gonal numbers and r4(8(k-2)N+n(k-4)2). We also show that if 4 k, any strictly increasing infinite subsequence on which r4,+k is bounded converges 2-adically to (k-4)2/(4-2k)∈Z2, supplementing a result of Meng and Sun, and if 4 k, there is no strictly increasing infinite subsequence on which r4,+k is bounded.