The Burnside ai-semiring variety defined by xn≈ x

Abstract

Let Sr(n, 1) denote the ai-semiring variety defined by the identity xn≈ x, where n>1. We characterize all subdirectly irreducible members of a semisimple subvariety of Sr(n, 1). Based on this result, we prove that Sr(n, 1) is hereditarily finitely based (resp., hereditarily finitely generated) if and only if n<4 and that the lattice of subvarieties of Sr(n, 1) is countable if and only if n<4. Also, we show that the class of all locally finite members of Sr(n, 1) forms a variety and so we affirmatively answer the restricted Burnside problem for Sr(n, 1). In addition, we provide a simplified proof of the main result obtained by Gajdos and Kuril (Semigroup Forum 80: 92--104, 2010).

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