On the sum of a prime and two Fibonacci numbers
Abstract
Let \fn\ be the Fibonacci sequence. For any positive integer n, let r(n) be the number of solutions of n=p+fk12 +fk22, where p is a prime and k1, k2 are nonnegative integers with k1 k2. In this paper, it is proved that \ n : r(n)=0\ contains an infinite arithmetic progression, and both sets \ n : r(n)=1\ and \ n : r(n) 2\ have positive asymptotic densities.
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