Representing the GCD as linear combination in non-PID rings
Abstract
In this note we prove the following fact: if finite many elements p1,p2,...,pn of a unique factorization domain are given such that the greatest common divisor of each pair (pi,pj) can be expressed as a linear combination of pi and pj then the greatest common divisor of all pis also can be expressed as a linear combination of p1,...,pn. We prove am analogous statement in commutative rings.
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