On exotic Diophantine triples in R[X]

Abstract

Originally, an exotic Diophantine triple is a set \a,b,c\ of distinct nonzero rational numbers for which \[ a+1, b+1, c+1, ab+1, ac+1, bc+1, abc+1 \] are all perfect squares. We prove that there is no such triple in R[X], with at least one nonconstant element, if none of a,b,c is equal to 1. Equivalently, under the distinct nonzero convention, every exotic Diophantine triple in R[X] with a nonconstant element must contain the element 1.

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