Journal article
Strongly abelian varieties and the Hamiltonian property
Abstract
Abstract
In this paper we show that every locally finite strongly Abelian variety satisfies the Hamiltonian property. An algebra is Hamiltonian if every one of its subuniverses is a block of some congruence of the algebra. A counterexample is provided to show that not all strongly Abelian varieties are Hamiltonian.
Authors
Kiss E; Valeriote M
Journal
Canadian Journal of Mathematics, Vol. 43, No. 2, pp. 331–346
Publisher
Canadian Mathematical Society
Publication Date
April 1, 1991
DOI
10.4153/cjm-1991-019-6
ISSN
0008-414X