Chains of Baire class 1 functions and various notions of special trees

Abstract

Following Laczkovich we consider the partially ordered set 1() of Baire class 1 functions endowed with the pointwise order, and investigate the order types of the linearly ordered subsets. Answering a question of Komj\'ath and Kunen we show (in ZFC) that special Aronszajn lines are embeddable into 1(). We also show that under Martin's Axiom a linearly ordered set L with |L|<2ω is embeddable into 1() iff L does not contain a copy of ω1 or ω1*. We present a ZFC-example of a linear order of size 2ω showing that this characterisation is not valid for orders of size continuum. These results are obtained using the notion of a compact-special tree; that is, a tree that is embeddable into the class of compact subsets of the reals partially ordered under reverse inclusion. We investigate how this notion is related to the well-known notion of an -special tree and also to some other notions of specialness.