On integers with many representations as the sum of kth powers of primes
Abstract
For a natural number k>1, let fk(n) denote the number of distinct representations of a natural number n of the form pk+qk for primes p,q. We prove that, for all k>1, n∞fk(n)=∞. This positively answers a conjecture of Erdos, which asks if there are natural numbers n with arbitrarily many distinct representations of the form p1k+p2k+…+pkk for primes p1,p2,…,pk.
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