Pregeometry over locally o-minimal structure and dimension
Abstract
We define a discrete closure operation for definably complete locally o-minimal structures M. The pair of the underlying set of M and the discrete closure operation forms a pregeometry. We define the rank of a definable set over a set of parameters using this fact. A definable set X is of dimension equal to the rank of X over the set of parameters of a formula defining the set X. The structure M is simultaneously a first-order topological structure. The dimension rank of a set definable in the first-order topological structure M also coincides with its dimension.
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