ω‐categorical weakly o‐minimal expansions of Boolean lattices

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Mathematical Logic Quarterly 49 (4):394-400 (2003)
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Abstract

We study ω‐categorical weakly o‐minimal expansions of Boolean lattices. We show that a structure ???? = (A,≤, ℐ) expanding a Boolean lattice (A,≤) by a finite sequence I of ideals of A closed under the usual Heyting algebra operations is weakly o‐minimal if and only if it is ω‐categorical, and hence if and only if A/I has only finitely many atoms for every I ∈ ℐ. We propose other related examples of weakly o‐minimal ω‐categorical models in this framework, and we examine the internal structure of these models.

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10.1002/malq.200310042

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Lattice Ordered O -Minimal Structures.Carlo Toffalori - 1998 - Notre Dame Journal of Formal Logic 39 (4):447-463.
On aleph0.B. Herwig, H. D. Macpherson, G. Martin, A. Nurtazin & J. K. Truss - 1999 - Annals of Pure and Applied Logic 101 (1):65-94.

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