Higher Separation Axioms for X-top Lattices Applications to Commutative (Semi)rings
Abstract
We study several separation axioms for X-top-lattices (i.e. a lattice L for which a given subset X⊂eq L \1\ admits a % Zariski-like topology). Such spaces are T0 and usually far away from being T2. We provide sufficient/necessary conditions for an X-top lattice so that X is T2, regular (T3), completely regular (T312), normal, completely normal or perfectly normal (T6). We apply our results mainly to the spectrum of prime (resp. maximal, minimal) ideals of a commutative (semi)ring. We illustrate our results with several examples/counterexamples.
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