Abstract
Abstract
We prove that a commutative parasemifield S is additively idempotent, provided that it is finitely generated as a semiring.
Consequently, every proper commutative semifield T that is finitely generated as a semiring is either additively constant or additively idempotent.
As part of the proof, we use the classification of finitely generated lattice-ordered groups to prove that a certain monoid associated to the parasemifield S has a distinguished geometrical property called prismality.
Subject
Applied Mathematics,General Mathematics
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