Regular semigroups of partial transformations preserving a fence N
From MaRDI portal
Publication:4985280
DOI10.30755/NSJOM.05333zbMath1474.20131OpenAlexW2792849059WikidataQ130199792 ScholiaQ130199792MaRDI QIDQ4985280
Jörg Koppitz, Laddawan Lohapan
Publication date: 23 April 2021
Published in: Novi Sad Journal of Mathematics (Search for Journal in Brave)
Full work available at URL: https://doi.org/10.30755/nsjom.05333
Related Items (4)
The rank of the inverse semigroup of all partial automorphisms on a finite crown ⋮ Congruences on infinite semigroups of transformations preserving a zig-zag order ⋮ Regularity in the semigroup of transformations preserving a zig-zag order ⋮ Various regularities for semigroups of transformations on a finite set determined by a zig-zag order
Cites Work
- Unnamed Item
- Unnamed Item
- On divisors of semigroups of order-preserving mappings of a finite chain.
- On the maximal regular subsemigroups of ideals of order-preserving or order-reversing transformations.
- The intersection of the maximal regular subsemigroups of the semigroup of binary relations
- The number of order-preserving maps of fences and crowns
- On the ranks of certain semigroups of order-preserving transformations
- On the structure of \(\mathcal{IO}_n\)
- Maximal regular subsemigroups of certain semigroups of transformations
- Presentations for some monoids of injective partial transformations on a finite chain.
- The formula for the number of order-preserving selfmappings of a fence
- The number of order-preserving maps between fences and crowns
- Regular subsemigroups of the semigroups of transformations preserving a fence
- COREGULARITY OF ORDER-PRESERVING SELF-MAPPING SEMIGROUPS OF FENCES
- DIVISORS OF SEMIGROUPS OF ORDER-PRESERVING MAPPINGS ON A FINITE CHAIN
- RANK PROPERTIES OF ENDOMORPHISMS OF INFINITE PARTIALLY ORDERED SETS
- The monoid of all injective order preserving partial transformations on a finite chain.
This page was built for publication: Regular semigroups of partial transformations preserving a fence N
