Every additively idempotent semiring satisfying xy≈ xz is finitely based
Abstract
We study the finite basis problem for additively idempotent semirings satisfying the identity xy ≈ xz. Let R denote the variety of all such semirings. Yue et al. (2025, Algebra Universalis, DOI:10.1007/s00012-025-00908-5) established that R is finitely generated. In this paper, we show that the subvariety lattice of R forms a distributive lattice of order 10. As a consequence, the variety R is a Cross variety, and every member of R is finitely based.
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