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  1. Weakly higher order cylindric algebras and finite axiomatization of the representables.I. Németi & A. Simon - 2009 - Studia Logica 91 (1):53 - 62.
    We show that the variety of n -dimensional weakly higher order cylindric algebras, introduced in Németi [9], [8], is finitely axiomatizable when n > 2. Our result implies that in certain non-well-founded set theories the finitization problem of algebraic logic admits a positive solution; and it shows that this variety is a good candidate for being the cylindric algebra theoretic counterpart of Tarski’s quasi-projective relation algebras.
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  • (1 other version)Complexity of equational theory of relational algebras with projection elements.Szabolcs Mikulás, Ildikó Sain & Andras Simon - 1992 - Bulletin of the Section of Logic 21 (3):103-111.
    The class \ of t rue p airing a lgebras is defined to be the class of relation algebras expanded with concrete set theoretical projection functions. The main results of the present paper is that neither the equational theory of \ nor the first order theory of \ are decidable. Moreover, we show that the set of all equations valid in \ is exactly on the \ level. We consider the class \ of the relation algebra reducts of \ ’s, (...)
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  • Non-Well-founded Sets.J. L. Bell - 1989 - Journal of Symbolic Logic 54 (3):1111-1112.
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  • Strong representability of fork algebras, a set theoretic foundation.I. Nemeti - 1997 - Logic Journal of the IGPL 5 (1):3-23.
    This paper is about pairing relation algebras as well as fork algebras and related subjects. In the 1991-92 fork algebra papers it was conjectured that fork algebras admit a strong representation theorem . Then, this conjecture was disproved in the following sense: a strong representation theorem for all abstract fork algebras was proved to be impossible in most set theories including the usual one as well as most non-well-founded set theories. Here we show that the above quoted conjecture can still (...)
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