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Pregeometry over locally o‐minimal structures and dimension
Mathematical Logic Quarterly (forthcoming)
Abstract
We define a discrete closure operator for definably complete locally o‐minimal structures. The pair of the underlying set of and the discrete closure operator forms a pregeometry. We define the rank of a definable set over a set of parameters using this fact and call it ‐dimension. A definable set X is of dimension equal to the ‐dimension of X. The structure is simultaneously a first‐order topological structure. The dimension rank of a set definable in the first‐order topological structure also coincides with its dimension.My notes
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References found in this work
Uniformly locally o-minimal structures and locally o-minimal structures admitting local definable cell decomposition.Masato Fujita - 2020 - Annals of Pure and Applied Logic 171 (2):102756.
Dimension of definable sets, algebraic boundedness and Henselian fields.Lou Van den Dries - 1989 - Annals of Pure and Applied Logic 45 (2):189-209.
Dimension inequality for a definably complete uniformly locally o-minimal structure of the second kind.Masato Fujita - 2020 - Journal of Symbolic Logic 85 (4):1654-1663.
Expansions of dense linear orders with the intermediate value property.Chris Miller - 2001 - Journal of Symbolic Logic 66 (4):1783-1790.
Locally o-Minimal Structures with Tame Topological Properties.Masato Fujita - 2023 - Journal of Symbolic Logic 88 (1):219-241.
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