Delhomme-Laflamme-Pouzet-Sauer space as groupoid
Abstract
Let R+=[0, ∞) and let d+ be the ultrametric on R+ such that d+ (x,y) = \x,y\ for all different x,y ∈ R+. It is shown that the monomorphisms of the groupoid (R+, d+) coincide with the injective ultrametric-preserving functions and that the automorphisms of (R+, d+) coincide with the self-homeomorphisms of R+. The structure of endomorphisms of (R+, d+) is also described.
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