On the additive structure of algebraic valuations of polynomial semirings II
Abstract
For α∈ C, let N0[α] be the subsemiring of~C obtained as a homomorphic image of the α-evaluation map N0[x] C defined as p(x) p(α) for each polynomial p(x) ∈ N0[x]. Fundamental arithmetic and atomic aspects of the additive structure of N0[α] were first studied by the second author and Correa-Morris (2022). In this paper, we continue the investigation, now from the valuation-theoretic perspective. We show that for any algebraic number α, the additive monoid of N0[α] contains no additive irreducibles if and only if it is isomorphic to the direct product of finitely many isomorphic valuation monoids (monoids whose principal ideals form a chain under inclusion). For any algebraic number α∈ (0,1), these valuation monoids are precisely those where α-1 is a Perron number having no positive conjugates other than itself. In addition, we offer a description of the algebraic parameters α for which the additive structure of N0[α] is a valuation monoid. Finally, we argue that the subset of (0,1) consisting of all algebraic parameters α such that the additive structure of N0[α] is a valuation monoid is dense in (0,1).
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