The countable condensation on linear orders

Abstract

The countable condensation on a linear order L is the equivalence relation ω defined by declaring x ω y when the set of points between x and y is countable. We characterize the linear orders L that condense to 1 under the countable condensation by constructing a linear order U that is universal for the order types L such that L/\!\!ω\, 1. We define a multiplication operation ·ω on the class of linear orders by setting M ·ω L to be the order type of (ML)/\!\!ω (where ML denotes the lexicographic product), and show that the right identities for ·ω are exactly the uncountable suborders of U. The order types of these uncountable suborders of U form a left regular band under ·ω, and the order types of all suborders of U form a semigroup.