Order convergence and compactness
classification
🧮 math.LO
keywords
topologyordercontainedconvergencecompactcompactnessfinerinterval
read the original abstract
Let $(P,\leq)$ be a partially ordered set and let $\tau$ be a compact topology on $P$ that is finer than the interval topology. Then $\tau$ is contained in the order (convergence) topology on $(P,\tau)$. So any Priestley topology is contained in the order topology.
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