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On finite retract lattices of monounary algebras
Abstract: ABSTRACT. For a monounary algebra (A, f ) we denote R ∅ (A, f ) the system of all retracts (together with the empty set) of (A, f ) ordered by inclusion. This system forms a lattice. We prove that if (A, f ) is a connected monounary algebra and R ∅ (A, f ) is finite, then this lattice contains no diamond. Next distributivity of R ∅ (A, f ) is studied. We find a representation of a certain class of finite distributive lattices as retract lattices of monounary algebras.
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Cited by 2 publications
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“…[7], [10] for non-complete review. Actual results concerning monounary algebras can be found in [1], [9] and [8].…”
Section: Introductionmentioning
confidence: 99%
“…[7], [10] for non-complete review. Actual results concerning monounary algebras can be found in [1], [9] and [8].…”
Section: Introductionmentioning
confidence: 99%
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