Antichains in products of linear orders
Abstract
1. For many regular cardinals lambda (in particular, for all successors of singular strong limit cardinals, and for all successors of singular omega-limits), for all n in 2,3,4, ... : There is a linear order L such that Ln has no (incomparability-)antichain of cardinality lambda, while Ln+1 has an antichain of cardinality lambda . 2. For any nondecreasing sequence (lambda2,lambda3, ...) of infinite cardinals it is consistent that there is a linear order L such that Ln has an antichain of cardinality lambdan, but not one of cardinality lambdan+ .
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