Ultrametric-preserving functions as monoid endomorphisms

Abstract

Let R+=[0, ∞) and let EndR+ be the set of all endomorphisms of the monoid (R+, ). The set EndR+ is a monoid with respect to the operation of the function composition g f. It is shown that g : R+ R+ is pseudoultrametric-preserving iff g ∈ EndR+. In particular, a function f : R+ R+ is ultrametrics-preserving iff it is an endomorphism of (R+,) with kernel consisting only the zero point. We prove that a given A ⊂eq EndR+ is a submonoid of (End, ) iff there is a class X of pseudoultrametric spaces such that A coincides with the set of all functions which preserve the spaces from X. An explicit construction of such X is given.