Levels of cancellation for monoids and modules
Abstract
Levels of cancellativity in commutative monoids M, determined by stable rank values in Z> 0 \∞\ for elements of M, are investigated. The behavior of the stable ranks of multiples ka, for k ∈ Z> 0 and a ∈ M, is determined. In the case of a refinement monoid M, the possible stable rank values in archimedean components of M are pinned down. Finally, stable rank in monoids built from isomorphism or other equivalence classes of modules over a ring is discussed.
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