Rigidity of Lyapunov exponents for polynomials
Abstract
Let f,g∈Q[z] be polynomials of degree d≥2 with disconnected Julia sets. We prove that they have the same Lyapunov exponent Lf=Lg if and only if either f and g are intertwined, or f and g are intertwined. The analogous result for critical heights is also obtained. As an application, we provide a new proof of the theorem stating that the multiplier spectrum morphism on the moduli space of polynomials is generically injective.
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