The lattice of all regular-solid varieties of semirings splits in two complete sublattices: the sublattice of all idempotent regular-solid varieties of semirings and the sublattice of all normal regular-solid varieties of semirings. In this paper, we discuss the idempotent part
summary:Completely regular semigroups $\mathcal {CR}$ are considered here with the unary operation o...
summary:Completely regular semigroups $\mathcal {CR}$ are considered here with the unary operation o...
: We use classical results on the lattice L(B) of varieties of band (idempotent) semigroups to obtai...
AbstractThere are exactly three non-trivial solid varieties of semirings, the variety of all rectang...
summary:The idempotent semirings for which Green’s ${\cal D}$-relation on the multiplicative reduct ...
summary:The idempotent semirings for which Green’s ${\cal D}$-relation on the multiplicative reduct ...
summary:The idempotent semirings for which Green’s ${\cal D}$-relation on the multiplicative reduct ...
We examine idempotent, entropic algebras (modes) which have a semilattice term. We are able to show ...
summary:Semirings are modifications of unitary rings where the additive reduct does not form a group...
summary:Semirings are modifications of unitary rings where the additive reduct does not form a group...
summary:Semirings are modifications of unitary rings where the additive reduct does not form a group...
Abstract. A semiring variety is d-semisimple if it is generated by the dis-tributive lattice of orde...
A variety of semirings is said to be solid if each of its identities is satisfied as hyperidentity. ...
Since the reduct of every residuated lattice is a semiring, we can ask under what condition a semiri...
Abstract We describe the least distributive lattice congruence on the semirings in the variety of al...
summary:Completely regular semigroups $\mathcal {CR}$ are considered here with the unary operation o...
summary:Completely regular semigroups $\mathcal {CR}$ are considered here with the unary operation o...
: We use classical results on the lattice L(B) of varieties of band (idempotent) semigroups to obtai...
AbstractThere are exactly three non-trivial solid varieties of semirings, the variety of all rectang...
summary:The idempotent semirings for which Green’s ${\cal D}$-relation on the multiplicative reduct ...
summary:The idempotent semirings for which Green’s ${\cal D}$-relation on the multiplicative reduct ...
summary:The idempotent semirings for which Green’s ${\cal D}$-relation on the multiplicative reduct ...
We examine idempotent, entropic algebras (modes) which have a semilattice term. We are able to show ...
summary:Semirings are modifications of unitary rings where the additive reduct does not form a group...
summary:Semirings are modifications of unitary rings where the additive reduct does not form a group...
summary:Semirings are modifications of unitary rings where the additive reduct does not form a group...
Abstract. A semiring variety is d-semisimple if it is generated by the dis-tributive lattice of orde...
A variety of semirings is said to be solid if each of its identities is satisfied as hyperidentity. ...
Since the reduct of every residuated lattice is a semiring, we can ask under what condition a semiri...
Abstract We describe the least distributive lattice congruence on the semirings in the variety of al...
summary:Completely regular semigroups $\mathcal {CR}$ are considered here with the unary operation o...
summary:Completely regular semigroups $\mathcal {CR}$ are considered here with the unary operation o...
: We use classical results on the lattice L(B) of varieties of band (idempotent) semigroups to obtai...
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