On the structure of length sets with maximal elasticity
Abstract
Let H be a Krull monoid with finite class group G and suppose that each class contains a prime divisor. Then every non-unit a ∈ H has a factorization into atoms, say a=u1 ·… · uk where k is the factorization length and u1, …, uk are atoms of H. The set L (a) of all possible factorizaton lengths is the length set of a, and (H) = \ L (a)/ L (a) a ∈ H \ is the elasticity of H. We study the structure of length sets of elements with maximal elasticity and show that, in general, these length sets are intervals.
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