On quasi-identities of finite modular lattices. II

IF 0.7 Q2 MATHEMATICS Bulletin of the Karaganda University-Mathematics Pub Date : 2023-06-30 DOI:10.31489/2023m2/45-52
A. Basheyeva, S. Lutsak
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引用次数: 1

Abstract

The existence of a finite identity basis for any finite lattice was established by R. McKenzie in 1970, but the analogous statement for quasi-identities is incorrect. So, there is a finite lattice that does not have a finite quasi-identity basis and, V.A. Gorbunov and D.M. Smirnov asked which finite lattices have finite quasiidentity bases. In 1984 V.I. Tumanov conjectured that a proper quasivariety generated by a finite modular lattice is not finitely based. He also found two conditions for quasivarieties which provide this conjecture. We construct a finite modular lattice that does not satisfy Tumanov’s conditions but quasivariety generated by this lattice is not finitely based.
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有限模格的拟恒等式。2
R. McKenzie于1970年建立了任意有限格的有限恒等基的存在性,但拟恒等基的类似陈述是不正确的。所以,存在一个有限格它没有有限的拟恒等基,V.A. Gorbunov和D.M. Smirnov问哪些有限格有有限的拟恒等基。1984年,V.I. Tumanov推测由有限模格生成的适当拟变簇不是有限基的。他还发现了两个准变项的条件来支持这个猜想。构造了一个不满足图马诺夫条件的有限模格,但其生成的准变分不是有限基的。
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来源期刊
Bulletin of the Karaganda University-Mathematics
Bulletin of the Karaganda University-Mathematics MATHEMATICS-
CiteScore
1.20
自引率
50.00%
发文量
50
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