The class of Aronszajn lines under epimorphisms
Abstract
A linear order A is called strongly surjective if for every non empty suborder B A, there is an epimorphism from A onto B (denoted by B A). We show, answering some questions of D\'aniel T. Soukup, that under MA_1 there is a strongly surjective Countryman line. We also study the general structure of the class of Aronszajn lines under , and compare it with the well known embeddability relation . Under PFA, the class of Aronszajn lines and the class of countable linear orders enjoy similar nice properties when viewed under the embeddability relation; both are well-quasi-ordered and have a finite basis. We show that this analogy does not extend perfectly to the relation; while it is known that the countable linear orders are still well-quasi-ordered under , we show that already in ZFC the class of Aronszajn lines has an infinite antichain, and under MA_1 an infinite decreasing chain as well. We show that some of the analogy survives by proving that under PFA, for some carefully constructed Countryman line C, C and C form a -basis for the class of Aronszajn lines. Finally we show that this does not extend to all uncountable linear orders by proving that there is never a finite -basis for the uncountable real orders.
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