Equationally defined classes of semigroups

Pub Date : 2023-11-03 DOI:10.1007/s00233-023-10397-4

Peter M. Higgins, Marcel Jackson

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引用次数: 0

Abstract

Abstract We apply, in the context of semigroups, the main theorem from the authors’ paper “Algebras defined by equations” (Higgins and Jackson in J Algebra 555:131–156, 2020) that an elementary class $${\mathscr {C}}$$ C of algebras which is closed under the taking of direct products and homomorphic images is defined by systems of equations. We prove a dual to the Birkhoff theorem in that if the class is also closed under the taking of containing semigroups, some basis of equations of $${\mathscr {C}}$$ C is free of the $$\forall $$ ∀ quantifier. We also observe the decidability of the class of equation systems satisfied by semigroups, via a link to systems of rationally constrained equations on free semigroups. Examples are given of EHP-classes for which neither $$(\forall \cdots )(\exists \cdots )$$ ( ∀ ⋯ ) ( ∃ ⋯ ) equation systems nor $$(\exists \cdots )(\forall \cdots )$$ ( ∃ ⋯ ) ( ∀ ⋯ ) systems suffice.

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相等定义的半群类

在半群的背景下，我们应用了作者的论文“由方程定义的代数”(Higgins和Jackson in J Algebra 555:131-156, 2020)中的主要定理，即代数的一个初等类$${\mathscr {C}}$$ C在取直积和同态象下是封闭的，它是由方程组定义的。我们证明了Birkhoff定理的对偶:如果该类在包含半群的取下也是闭的，则$${\mathscr {C}}$$ C的某些方程的基不包含$$\forall $$∀量词。通过与自由半群上的理性约束方程组的联系，我们还观察到一类由半群满足的方程组的可决性。给出了一些ehp类的例子，其中$$(\forall \cdots )(\exists \cdots )$$(∀⋯)(∃⋯)方程系统和$$(\exists \cdots )(\forall \cdots )$$(∃⋯)(∀⋯)系统都不够用。

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