Waring and Waring-Goldbach subbases with prescribed representation function

Abstract

Let h≥ 2. For A⊂eq N write \[ rA,h(n) := \#\(x1,…,xh)∈ Ah ~|~ x1+·s+xh=n\. \] We prove a general probabilistic subbasis principle: assuming an asymptotic for a weighted h-fold representation sum over a basis B, there exist subbases A⊂eq B whose representation function rA,h(n) has prescribed regularly varying growth. We apply this to k-th powers Nk and to k-th powers of primes Pk. For h ≥ k2-k+O(k), we show that every regularly varying function F with F(x)/ x∞ in the admissible range is realized, with the expected singular series factor. In particular, there exists A⊂eq Nk such that \[ rA,h(n) Sk,h(n) F(n). \] Moreover, in the prime setting we obtain thin subbases A⊂eq Pk with rA,h(n) n for n in the admissible congruence classes.