Submanifold projections and hyperbolicity in Out(Fn)
Abstract
The free splitting graph of a free group Fn with n≥ 2 generators is a hyperbolic Out(Fn)-graph which has a geometric realization as a sphere graph in the connected sum of n copies of S1× S2. We use this realization to construct submanifold projections of the free splitting graph into the free splitting graphs of proper free factors. This is used to construct for n≥ 3 a new hyperbolic Out(Fn)-graph. If n=3, then every exponentially growing element acts on this graph with positive translation length.
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