Conservative median algebras and semilattices
arXiv:1405.0935 · doi:10.1007/s11083-015-9356-x
Abstract
We characterize conservative median algebras and semilattices by means of forbidden substructures and by providing their representation as chains. Moreover, using a dual equivalence between median algebras and certain topological structures, we obtain descriptions of the median-preserving mappings between products of finitely many chains.