The power of trees
Abstract
We give two consistent constructions of trees T whose finite power Tn+1 is sharply different from Tn: 1. An 1-tree T whose interval topology XT is perfectly normal, but (XT)2 is not even countably metacompact. 2. For an inaccessible and a positive integer n, a -tree such that all of its n-derived trees are Souslin and all of its (n+1)-derived trees are special.
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