On the system of length sets of power monoids
Abstract
The set P fin,0(N0) of all finite subsets of N0 containing the zero element is a monoid with set addition as operation. If a set A∈P fin,0(N0) can be written in the form A=Σi=1 Ai with ∈N0 and indecomposable elements (Ai)i=1 of P fin,0(N0), then is a factorization length of A and L(A)⊂eqN0 denotes the set of all possible factorization lengths of A. We show that for each rational number q≥ 1, there is some A∈P fin,0(N0) such that q=(L(A))(L(A)). This supports a Conjecture of Fan and Tringali.
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