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Weaver N · 1999

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Lattice isomorphisms between certain sublattices of continuous functions

math.FA · 2019-07-20 · unverdicted · novelty 4.0

Lattice isomorphisms between separation-property sublattices of C(X,I) and C(Y,I) induce homeomorphisms μ:Y→X; with multiplication closure they admit pointwise representation via strictly increasing maps on a dense Gδ set, and everywhere for Lipschitz functions on metric spaces.

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  • Lattice isomorphisms between certain sublattices of continuous functions math.FA · 2019-07-20 · unverdicted · none · ref 13

    Lattice isomorphisms between separation-property sublattices of C(X,I) and C(Y,I) induce homeomorphisms μ:Y→X; with multiplication closure they admit pointwise representation via strictly increasing maps on a dense Gδ set, and everywhere for Lipschitz functions on metric spaces.