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On subalgebra lattices of a finite unary algebra. II. (English) Zbl 0978.08004
Summary: We use graph-algebraic results from the first part of this paper [ibid. 126, No. 1, 161-170 (2001; Zbl 0978.08003), reviewed above] and some results of graph theory to characterize all pairs $$\langle \mathcal L_{1},\mathcal L_{2}\rangle$$ of lattices for which there is a finite partial unary algebra such that its weak and strong subalgebra lattices are isomorphic to $$\mathcal L_{1}$$ and $$\mathcal L_{2}$$, respectively. Next, we describe other pairs of subalgebra lattices (weak and relative, etc.) of a finite unary algebra. Finally, necessary and sufficient conditions are found for quadruples $$\langle \mathcal L_{1},\mathcal L_{2}, \mathcal L_{3},\mathcal L_{4}\rangle$$ of lattices for which there is a finite unary algebra having its weak, relative, strong subalgebra and initial segment lattices isomorphic to $$\mathcal L_{1},\mathcal L_{2}, \mathcal L_{3},\mathcal L_{4}$$, respectively.

MSC:
 08A60 Unary algebras 08A30 Subalgebras, congruence relations 06B15 Representation theory of lattices 05C20 Directed graphs (digraphs), tournaments 08A55 Partial algebras
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