Defines the median uniformity U_m on median algebras to construct the Minimal Median Compactification (MMC) as a natural compactification for group actions by median automorphisms, with uniqueness and tameness results under finite intervals or finite rank.
van Mill,Supercompactness and Wallman Spaces, Math
2 Pith papers cite this work. Polarity classification is still indexing.
2
Pith papers citing it
years
2026 2verdicts
UNVERDICTED 2representative citing papers
Finite-rank median algebras satisfy rank equals independence number of median-preserving maps to [0,1], implying a Helly-type selection principle and tameness of continuous group actions by median automorphisms.
citing papers explorer
-
Intrinsic uniform structure on median algebras
Defines the median uniformity U_m on median algebras to construct the Minimal Median Compactification (MMC) as a natural compactification for group actions by median automorphisms, with uniqueness and tameness results under finite intervals or finite rank.
-
Tameness of actions on finite rank median algebras
Finite-rank median algebras satisfy rank equals independence number of median-preserving maps to [0,1], implying a Helly-type selection principle and tameness of continuous group actions by median automorphisms.