There exists a d-minimal expansion of the R-vector space over R which defines every sequence
Abstract
There exists a d-minimal expansion of the R-vector space over R which defines every sequence. In this paper, we prove this assertion and the following more general assertion: Let R be either the ordered R-vector space structure over R or the ordered group of reals. A first-order expansion of R by a countable subset D of R and a compact subset E of R of finite Cantor-Bendixson rank is d-minimal if ( R,D) is locally o-minimal.
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