On the variety generated by involutive pocrims

Reports on Mathematical Logic (2007)
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Abstract

An involutive pocrim is a residuated integral partially ordered commutative monoid with an involution operator, considered as an algebra. It is proved that the variety generated by all involutive pocrims satisfies no nontrivial idempotent Maltsev condition. That is, no nontrivial $\langle\wedge,\vee,\circ\rangle$-equation holds in the congruence lattices of all involutive pocrims. This strengthens a theorem of A. Wro\'{n}ski. The result survives if we restrict the generating class to totally ordered involutive pocrims.

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Correspondences between Gentzen and Hilbert Systems.J. G. Raftery - 2006 - Journal of Symbolic Logic 71 (3):903 - 957.

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