Diophantine triples with values in k-generalized Fibonacci sequences
Abstract
We show that if k 2 is an integer and (Fn(k))n 0 is the sequence of k-generalized Fibonacci numbers, then there are only finitely many triples of positive integers 1<a<b<c such that ab+1,~ac+1,~bc+1 are all members of \Fn(k): n 1\. This generalizes a previous result (cf. arXiv:1508.07760) where the statement for k=3 was proved. The result is ineffective since it is based on Schmidt's subspace theorem.
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