On Graev type ultra-metrics
Abstract
We study Graev ultra-metrics which were introduced by Gao. We show that the free non-archimedean balanced topological group defined over an ultra-metric space is metrizable by a Graev ultra-metric. We prove that the Graev ultra-metric has a maximal property. Using this property, among others, we show that the Graev ultra-metric associated with an ultra-metric space (X,d) with diameter≤ 1 coincides with the ultra-metric d of Savchenko and Zarichnyi.
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