The Structure of -Maximal Cofinitary Groups

Abstract

We study -maximal cofinitary groups for regular uncountable, = <. Revisiting earlier work of Kastermans and building upon a recently obtained higher analogue of Bell's theorem, we show that: 1. Any -maximal cofinitary group has < many orbits under the natural group action of S() on . 2. If p() = 2 then any partition of into less than many sets can be realized as the orbits of a -maximal cofinitary group. 3. For any regular λ > it is consistent that there is a -maximal cofinitary group which is universal for groups of size <2 = λ. If we only require the group to be universal for groups of size then this follows from p() = 2.