Maximum linearizations of lower sets in Nm with application to monomial ideals
Abstract
We compute the type (maximum linearization) of the well partial order of bounded lower sets in Nm, ordered under inclusion, and find it is ωωm-1. Moreover we compute the type of the set of all lower sets in Nm, a topic studied by Aschenbrenner and Pong, and find that it is equal to \[ ωΣk=1m ωm-kmk-1 + 1. \] As a consequence we deduce corresponding bounds on effectively given sequences of monomial ideals in F[X,Y] where F is a field.
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