Results on Colored Tree Properties

Abstract

In this paper, we introduce novel variations on several well-known model-theoretic tree properties, and prove several equivalences to known properties. Motivated by the study of generalized indiscernibles, we introduce the notion of the -tree property (-TP), for an arbitrary Ramsey index structure . We focus attention on the colored linear order index structure c, showing that c-TP is equivalent to instability. After introducing c- and c-, we prove that c- is equivalent to , and that c- is equivalent to IP. We see that these three tree properties give a dichotomy theorem, just as with TP, , and . Along the way, we observe that appropriately generalized tree index structures <ω are Ramsey, allowing for the use of generalized tree indiscernibles.