On a relation between λ-full well-ordered sets and weakly compact cardinals
Abstract
We prove, via transfinite recursion, the existence, inside any linearly ordered set of appropriate regular cardinality λ, of a particular kind of well-ordered subsets characterized by the property of λ-fullness. Let H be a set of regular cardinals: by using our results about well-ordered λ-full sets we show that if ∈f H is a weakly compact cardinal, then, for every LOTS X, H-compactness is equivalent to the nonexistence of gaps of types in H.
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