Currents relative to a malnormal subgroup system
Abstract
This paper introduces a new topological space associated with a nonabelian free group Fn of rank n and a malnormal subgroup system A of Fn, called the space of currents relative to A, which are Fn-invariant measures on an appropriate subspace of the double boundary of Fn. The extension from free factor systems as considered by Gupta to malnormal subgroup systems is necessary in order to fully study the growth under iteration of outer automorphisms of Fn, and requires the introduction of new techniques on cylinders. We in particular prove that currents associated with elements of Fn which are not contained in a conjugate of a subgroup of A are dense in the space of currents relative to A.
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