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Locally convex topological lattices
Abstract: Abstract. The main theorem of this paper is: Suppose that L is a topological lattice of finite breadth n. Then L can be embedded in a product of n compact chains if and only if L is locally convex and distributive. With this result it is then shown that the concepts of metrizability and separability are equivalent for locally convex, connected, distributive topological lattices of finite breadth.In [8] R. P. Dilworth proved that every distributive lattice of finite breadth n could be embedded (algebraically) i…
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Cited by 5 publications
(4 citation statements)
References 21 publications
(11 reference statements)
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“…This (nontrivial) fact, together with Corollary This alternative proof relies on an "alien" completely distributive lattice structure on the intervals of X, which is hiding behind the structure of convexity. Also, when comparing our proof to the one of [19], it appears that the original argument in 2.2 is more direct. We now work towards some improvements of Theorem 0.1.…”
Section: Corollary (Comparementioning
confidence: 75%
“…This (nontrivial) fact, together with Corollary This alternative proof relies on an "alien" completely distributive lattice structure on the intervals of X, which is hiding behind the structure of convexity. Also, when comparing our proof to the one of [19], it appears that the original argument in 2.2 is more direct. We now work towards some improvements of Theorem 0.1.…”
Section: Corollary (Comparementioning
confidence: 75%
“…Using either [62,Proposition 1.13.3] or a combination of [25,] and the proof of [25, Proposition III-2.13], one can assert that L is also locally convex with respect to the order convexity. Thus, [59,Theorem 3.1], due to Stralka, can be applied: L as a topological lattice can be embedded (algebraically and topologically) in a product of b compact (connected) chains C = b j=1 C j . As a consequence, K as a topological semilattice also embeds in C. For each j = 1, .…”
Section: Semilattices With Finite Breadthmentioning
confidence: 99%
“…For instance, [25, Proposition VII-2.8] gives a lattice counterpart to the fundamental theorem 4.1. Also, Choe [12,13] and Stralka [59] among others studied topological lattices with small lattices, which are nothing but locally convex topological lattices.…”
Section: 4mentioning
confidence: 99%
“…Baker and Stralka, [30], showed that every compact and every locally compact connected distributive lattice of finite breadth n could be embedded in a product of n compact chains. Further results are given in [41].…”
mentioning
confidence: 95%
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