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Lattices in quasiordered sets. (English) Zbl 0773.06002

Let \(Q\) be a quasiorder on a set \(A\). It is shown that the factor set \(A/Q\cap Q^{-1}\) ordered by the induced order is a lattice if and only if \(A\) can be equipped with two binary operations satisfying a set of identities, similar to those for lattices, and determining the quasiorder \(Q\).
Reviewer: J.Niederle (Brno)

MSC:

06A06 Partial orders, general
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References:

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