Orbits in Teichm\"uller dynamics admits a critical exponent gap
Abstract
McMullen '03 constructs a collection of orbits SL2(R).x in H(1,1) with infinitely generated stabilizers stabSL2(R)(x). We prove a gap in the set of critical exponents of stabilizers of SL2(R)-orbits in Hg: for every x∈ Hg, either stabSL2(R)(x) is a lattice, or we have a uniform bound on the critical exponent δ(stabSL2(R)(x)) 1-g.
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