On continuous polynomials of the Mac\'ias space

Abstract

Let N be the set of natural numbers. The Mac\'ias space M(N) is the topological space (N,τM) where τM is generated by the collection of sets σn := \ m ∈ N : (n, m) = 1 \. In this paper, we characterize the continuity of polynomials over M(N) and prove that the only continuous polynomials are monomials

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