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Displaying 101 – 120 of 295

A note on equalities of radicals in a semigroup

František Kmeť (1983)

Mathematica Slovaca

A Note on Extensions of Bear and P.p.-rings

N. J. Groenewald (1983)

Publications de l'Institut Mathématique

A note on factorizable Transformation Semigroups.

Y. Kemprasit (1981)

Semigroup forum

A note on f-disjunctive languages.

C.M. Reis (1987)

Semigroup forum

A note on generalized commutative semigroups.

K. Venu Raju, J. Hanumanthachari (1981)

Semigroup forum

A note on Green’s relations in $ℬ 𝒬$ -semigroups

Bruce W. Mielke (1972)

Czechoslovak Mathematical Journal

A note on homomorphisms of a free monoid.

C.M. Reis (1978)

Semigroup forum

A note on idempotent separating congruences on a regular semigroup

K. Kumaresan (1984)

Czechoslovak Mathematical Journal

A note on indecomposable elements in the tensor product of semigroups

Jana Galanová (1985)

Mathematica Slovaca

A note on intersections of free submonoids of a free monoid.

J. Karhumäki (1984)

Semigroup forum

A note on left cancellative semigroups without idempotents.

G.h. Chen (1974)

Semigroup forum

A note on locally inverse semigroup algebras.

Guo, Xiaojiang (2008)

International Journal of Mathematics and Mathematical Sciences

A note on minimal and maximal ideals of ordered semigroups.

Arslanov, M., Kehayopulu, N. (2002)

Lobachevskii Journal of Mathematics

A note on mutants in semigroups

Syed A. Huq (1973)

Czechoslovak Mathematical Journal

A note on my paper "Notes on compact semigroups with identity".

W. Ruppert (1978)

Semigroup forum

A note on non-commutative semigroups

Venu Raju, K., Hanumanthachari, J. (1983/1984)

Portugaliae mathematica

A note on orthodox additive inverse semirings

M. K. Sen, S. K. Maity (2004)

Acta Universitatis Palackianae Olomucensis. Facultas Rerum Naturalium. Mathematica

We show in an additive inverse regular semiring $(S, +, \cdot)$ with $E^{•} (S)$ as the set of all multiplicative idempotents and $E^{+} (S)$ as the set of all additive idempotents, the following conditions are equivalent: (i) For all $e, f \in E^{•} (S)$ , $e f \in E^{+} (S)$ implies $f e \in E^{+} (S)$ . (ii) $(S, \cdot)$ is orthodox. (iii) $(S, \cdot)$ is a semilattice of groups. This result generalizes the corresponding result of regular ring.

A note on ....-permutable semigroups.

A. de Luca, S. Varricchio (1990)

Semigroup forum

A note on principal ideals and $𝒥$ -classes in the direct product of two semigroups

Imrich Fabrici (2000)

Czechoslovak Mathematical Journal

A note on probabilistic representations of operator semigroups.

D. Pfeifer (1984)

Semigroup forum

Currently displaying 101 – 120 of 295

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