On the number of subdirect products involving semigroups of integers and natural numbers
Abstract
We extend a recent result that for the (additive) semigroup of positive integers N, there are continuum many subdirect products of N × N up to isomorphism. We prove that for U,V each one of Z (the group of integers), N0 (the monoid of non-negative integers), or N, we prove that U × V has continuum many (semigroup) subdirect products up to isomorphism.
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