On the Diophantine equation Σj=1kjFjp=Fnq
Abstract
Let Fn denote the nth term of the Fibonacci sequence. In this paper, we investigate the Diophantine equation F1p+2F2p+·s+kFkp=Fnq in the positive integers k and n, where p and q are given positive integers. A complete solution is given if the exponents are included in the set \1,2\. Based on the specific cases we could solve, and a computer search with p,q,k100 we conjecture that beside the trivial solutions only F8=F1+2F2+3F3+4F4, F42=F1+2F2+3F3, and F43=F13+2F23+3F33 satisfy the title equation.
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