Another proof that ISP r is the least quasivariety containing K

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Studia Logica 41 (4):343 - 345 (1982)
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Abstract

Let q(K) denote the least quasivariety containing a given class K of algebraic structures. Mal'cev [3] has proved that q(K) = ISP r(K)(1). Another description of q(K) is given in Grätzer and Lakser [2], that is, q(K) = ISPP u(K)2. We give here other proofs of these results. The method which enables us to do that is borrowed from prepositional logics (cf. [1]).

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10.1007/bf00403333

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