Lattices of uniformly continuous functions determine their sublattices of bounded functions

Publikace na Matematicko-fyzikální fakulta |

2015

Abstrakt

If two uniform spaces have isomorphic lattices of their uniformly continuous real-valued functions then also their sublattices of bounded functions are isomorphic. That result is used to give a different correct proof of Shirota theorem (complete metric spaces are determined by their uniformly continuous real-valued functions) than that in [1].

Klíčová slova

Lattice of functions Uniform continuity

Lattices of uniformly continuous functions determine their sublattices of bounded functions

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Klíčová slova

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Abstrakt