Cardinality of the sets of dimension functions in ordered structures
Abstract
We compute the cardinality n( M) of the sets of dimension functions on the ordered structures M. The inequality n( M) ≤ 1 holds if M is a d-minimal expansion of an ordered group. If M is o-minimal and n( M)<∞, there exists a positive integer m such that n( M)=2m-1. For every positive integer m, there exists a weakly o-minimal expansion M of an ordered divisible Abelian group such that n( M)=m.
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