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  1. Moderate families in Boolean algebras.Lutz Heindorf - 1992 - Annals of Pure and Applied Logic 57 (3):217-250.
    Heidorf, L., Moderate families in Boolean algebras, Annals of Pure and Applied Logic 57 217–250. A subset F of a Boolean algebra B will be called moderate if no element of B splits infinitely many elements of F . Disjoint moderate sets occur in connection with a product construction that is systematically studied in this paper. In contrast to the usual full direct product, these so-called moderate products preserve many properties of their factors. This can be used, for example, to (...)
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  • Chains in Boolean algebras.R. Mckenzie - 1982 - Annals of Mathematical Logic 22 (2):137.
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  • Priestley duality for some subalgebra lattices.Georges Hansoul - 1996 - Studia Logica 56 (1-2):133 - 149.
    Priestley duality can be used to study subalgebras of Heyting algebras and related structures. The dual concept is that of congruence on the dual space and the congruence lattice of a Heyting space is dually isomorphic to the subalgebra lattice of the dual algebra. In this paper we continue our investigation of the congruence lattice of a Heyting space that was undertaken in [10], [8] and [12]. Our main result is a characterization of the modularity of this lattice (Theorem 2.12). (...)
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