Decompositions of directed sets with zero
Mathematica Slovaca (1995)
- Volume: 45, Issue: 1, page 9-17
- ISSN: 0139-9918
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topHalaš, Radomír. "Decompositions of directed sets with zero." Mathematica Slovaca 45.1 (1995): 9-17. <http://eudml.org/doc/32235>.
@article{Halaš1995,
author = {Halaš, Radomír},
journal = {Mathematica Slovaca},
keywords = {ideal lattice; decompositions of directed ordered sets with zero; pairs of ideals},
language = {eng},
number = {1},
pages = {9-17},
publisher = {Mathematical Institute of the Slovak Academy of Sciences},
title = {Decompositions of directed sets with zero},
url = {http://eudml.org/doc/32235},
volume = {45},
year = {1995},
}
TY - JOUR
AU - Halaš, Radomír
TI - Decompositions of directed sets with zero
JO - Mathematica Slovaca
PY - 1995
PB - Mathematical Institute of the Slovak Academy of Sciences
VL - 45
IS - 1
SP - 9
EP - 17
LA - eng
KW - ideal lattice; decompositions of directed ordered sets with zero; pairs of ideals
UR - http://eudml.org/doc/32235
ER -
References
top- GRÄTZER G., General Lattice Theory, (Russian translation), Moscow, 1982. (1982) Zbl0518.06001
- HALAŠ R., Pseudocomplemented ordered sets, Arch. Math. (Brno) 29 (1993), 3-4, 153-160. (1993) Zbl0801.06007MR1263116
- KOLIBIAR M., Congruence relations and direct decompositions of ordered sets, Acta Sci. Math. (Szeged) 51 (1987), 129-135. (1987) Zbl0645.06003MR0911564
- KOLIBIAR M., Congruence relations and direct decompositions of ordered sets II, In: Contribution to General Algebra 6. Hälder-Pichler-Tempski, 1988, pp. 167-172. (1988) Zbl0701.06002MR1078035
- RACHŮNEK J., O-idèaux des ensembles ordonnées, Acta Univ. Palack. Olomouc Fac. Rerum Natur. Math. 45 (1974), 77-81. (1974) MR0382085
Citations in EuDML Documents
top- Radomír Halaš, Some properties of boolean ordered sets
- Cyndyma Batueva, Marina Semenova, Ideals in distributive posets
- Ján Jakubík, On direct and subdirect product decompositions of partially ordered sets
- Vilas S. Kharat, Khalid A. Mokbel, Primeness and semiprimeness in posets
- Radomír Halaš, Relative polars in ordered sets
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