Matrix invertible extensions over commutative rings. Part I: general theory
Abstract
A unimodular 2× 2 matrix with entries in a commutative R is called extendable (resp.\ simply extendable) if it extends to an invertible 3× 3 matrix (resp.\ invertible 3× 3 matrix whose (3,3) entry is 0). We obtain necessary and sufficient conditions for a unimodular 2× 2 matrix to be extendable (resp.\ simply extendable) and use them to study the class E2 (resp.\ SE2) of rings R with the property that all unimodular 2× 2 matrices with entries in R are extendable (resp.\ simply extendable). We also study the larger class 2 of rings R with the property that all unimodular 2× 2 matrices of determinant 0 and with entries in R are (simply) extendable (e.g., rings with trivial Picard groups or pre-Schreier domains). Among Dedekind domains, polynomial rings over Z and Hermite rings, only the EDRs belong to the class E2 or SE2. If as(R) 2, then R is an E2 ring iff it is an SE2 ring.
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