On band orthorings

Abstract

A semiring S which is a union of rings is called completely regular, if moreover, it is orthodox then S is called an orthoring. Here we study the orthorings S such that E+(S) is a band semiring. Every band semiring is a spined product of a left band semiring and a right band semiring with respect to a distributive lattice. A similar spined product decomposition for the band orthorings have been proved. The interval [Ri, BOR] is lattice isomorphic to the lattice L(BI) of all varieties of band semirings, where Ri and BOR are the varieties of all rings and band orthorings, respectively.