Lower Bounds for non-Archimedean Lyapunov Exponents

Abstract

Let K be a complete, algebraically closed, non-Archimedean valued field, and let P1 denote the Berkovich projective line over K. The Lyapunov exponent for a rational map φ∈ K(z) of degree d≥ 2 measures the exponential rate of growth along a typical orbit of φ. When φ is defined over C, the Lyapunov exponent is bounded below by 12 d. In this article, we give a lower bound for L(φ) for maps φ defined over non-Archimedean fields K. The bound depends only on the degree d and the Lipschitz constant of φ. For maps φ whose Julia sets satisfy a certain boundedness condition, we are able to remove the dependence on the Lipschitz constant.