Four squares from three real polynomials
Abstract
We construct three nonconstant polynomials a,b,c∈ R[X] such that \[ab+1, ac+1, bc+1, abc+1 \] are all squares in R[X]. The entries in the construction are quadratic, so the construction has the smallest possible positive degrees. By composition with nonconstant polynomials, this gives infinitely many examples over R[X] with all entries nonconstant.
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