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Displaying 61 – 80 of 112

On inverse categories with split idempotents

Emil Schwab, Emil Daniel Schwab (2015)

Archivum Mathematicum

We present some special properties of inverse categories with split idempotents. First, we examine a Clifford-Leech type theorem relative to such inverse categories. The connection with right cancellative categories with pushouts is illustrated by simple examples. Finally, some basic properties of inverse categories with split idempotents and kernels are studied in terms of split idempotents which generate (right or left) principal ideals of annihilators.

On left absolutely flat monoids.

S. Bulman-Fleming, V.A.R. Gould (1990)

Semigroup forum

On monoids over which all strongly flat cyclic right acts are projective.

M. Kilp (1996)

Semigroup forum

On nets of free polygons over a category and their categories of homomorphisms

Jaak Hion (1987)

Beiträge zur Algebra und Geometrie = Contributions to algebra and geometry

On p -semisimple S-sets.

Z. Goseki (1993)

Semigroup forum

On partial cohomologies of semigroups.

B.V. Novikov (1984)

Semigroup forum

On P-injective hulls of S-sets.

Z. Goseki, H.J. Weinert (1985)

Semigroup forum

On representations of tolerance ordered commutative semigroups

Bedřich Pondělíček (1981)

Czechoslovak Mathematical Journal

On right self-injective regular semigroups.

K. Shoji (1982)

Semigroup forum

On self-injective semigroups satisfying the minimal conditions.

K. Shoji (1984)

Semigroup forum

On semilattices of groups whose arrows are epimorphisms.

Abdallah, M.El-Ghali M., Gab-Alla, L.N., Elagan, Sayed K.M. (2006)

International Journal of Mathematics and Mathematical Sciences

On some properties of Brandt groupoids.

Wainberg, Dorin (2004)

Acta Universitatis Apulensis. Mathematics - Informatics

On strongly $(P)$ -cyclic acts

Akbar Golchin, Parisa Rezaei, Hossein Mohammadzadeh (2009)

Czechoslovak Mathematical Journal

By a regular act we mean an act such that all its cyclic subacts are projective. In this paper we introduce strong $(P)$ -cyclic property of acts over monoids which is an extension of regularity and give a classification of monoids by this property of their right (Rees factor) acts.

Currently displaying 61 – 80 of 112

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Displaying 61 – 80 of 112

On inverse categories with split idempotents

On left absolutely flat monoids.

On monoids over which all strongly flat cyclic right acts are projective.

On nets of free polygons over a category and their categories of homomorphisms

On p -semisimple S-sets.

On partial cohomologies of semigroups.

On P-injective hulls of S-sets.

On representations of tolerance ordered commutative semigroups

On right self-injective regular semigroups.

On self-injective semigroups satisfying the minimal conditions.

On semilattices of groups whose arrows are epimorphisms.

On some properties of Brandt groupoids.

On strongly $(P)$ -cyclic acts

On the equation xt- » xt+q in categories.

On two papers of B.M. Schein.

Orthodox semidirect products and wreath products of monoids.

Perfect monoids revisited.

Periodic monoids over which all flat cyclic right acts satisfy condition (P).

Products of Idempotent Endomorphisms of Free Acts of Infinite Rank.

Projectives in inverse semigroups.

Currently displaying 61 – 80 of 112