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FINITE NILSEMIGROUPS WITH MODULAR CONGRUENCE LATTICES. / Popovich, Alexander L.
In: Ural Mathematical Journal, Vol. 3, No. 1 (4), 2017, p. 52-67.

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Harvard

Popovich, AL 2017, 'FINITE NILSEMIGROUPS WITH MODULAR CONGRUENCE LATTICES', Ural Mathematical Journal, vol. 3, no. 1 (4), pp. 52-67. https://doi.org/10.15826/umj.2017.1.004

APA

Popovich, A. L. (2017). FINITE NILSEMIGROUPS WITH MODULAR CONGRUENCE LATTICES. Ural Mathematical Journal, 3(1 (4)), 52-67. https://doi.org/10.15826/umj.2017.1.004

Vancouver

Popovich AL. FINITE NILSEMIGROUPS WITH MODULAR CONGRUENCE LATTICES. Ural Mathematical Journal. 2017;3(1 (4)):52-67. doi: 10.15826/umj.2017.1.004

Author

Popovich, Alexander L. / FINITE NILSEMIGROUPS WITH MODULAR CONGRUENCE LATTICES. In: Ural Mathematical Journal. 2017 ; Vol. 3, No. 1 (4). pp. 52-67.

BibTeX

@article{90530ff2695d4e0daa26e2a015d4ca0e,
title = "FINITE NILSEMIGROUPS WITH MODULAR CONGRUENCE LATTICES",
abstract = "This paper continues the joint work [2] of the author with P. Jones. We describe all finitely generated nilsemigroups with modular congruence lattices: there are 91 countable series of such semigroups. For finitely generated nilsemigroups a simple algorithmic test to the congruence modularity is obtained.",
author = "Popovich, {Alexander L.}",
year = "2017",
doi = "10.15826/umj.2017.1.004",
language = "English",
volume = "3",
pages = "52--67",
journal = "Ural Mathematical Journal",
issn = "2414-3952",
publisher = "Институт математики и механики им. Н.Н. Красовского УрО РАН",
number = "1 (4)",

}

RIS

TY - JOUR

T1 - FINITE NILSEMIGROUPS WITH MODULAR CONGRUENCE LATTICES

AU - Popovich, Alexander L.

PY - 2017

Y1 - 2017

N2 - This paper continues the joint work [2] of the author with P. Jones. We describe all finitely generated nilsemigroups with modular congruence lattices: there are 91 countable series of such semigroups. For finitely generated nilsemigroups a simple algorithmic test to the congruence modularity is obtained.

AB - This paper continues the joint work [2] of the author with P. Jones. We describe all finitely generated nilsemigroups with modular congruence lattices: there are 91 countable series of such semigroups. For finitely generated nilsemigroups a simple algorithmic test to the congruence modularity is obtained.

UR - https://elibrary.ru/item.asp?id=29728774

U2 - 10.15826/umj.2017.1.004

DO - 10.15826/umj.2017.1.004

M3 - Article

VL - 3

SP - 52

EP - 67

JO - Ural Mathematical Journal

JF - Ural Mathematical Journal

SN - 2414-3952

IS - 1 (4)

ER -

ID: 6567489