On the idempotent semirings such that D is the least distributive lattice congruence

Abstract

Here we describe the least distributive lattice congruence η on an idempotent semiring in general and characterize the varieties D, L and R of all idempotent semirings such that η=D, L and R, respectively. If S ∈ D [L, R], then the multiplicative reduct (S, ·) is a [left, right] normal band. Every semiring S ∈ D is a spined product of a semiring in L and a semiring in R with respect to a distributive lattice.