Equilibrium measures for rational maps
- 1 June 1986
- journal article
- research article
- Published by Cambridge University Press (CUP) in Ergodic Theory and Dynamical Systems
- Vol. 6 (3), 393-399
- https://doi.org/10.1017/s0143385700003576
Abstract
For a polynomial map the measure of maximal entropy is the equilibrium measure for the logarithm potential in the Julia set [1], [4].Here we will show that in the case where f is a rational map such that f(∞) = ∞ and the Julia set is bounded, then the two measures mentioned above are equal if and only if f is a polynomial.Keywords
This publication has 5 references indexed in Scilit:
- An invariant measure for rational mapsBulletin of the Brazilian Mathematical Society, New Series, 1983
- On the uniqueness of the maximizing measure for rational mapsBulletin of the Brazilian Mathematical Society, New Series, 1983
- Orthogonal polynomials on a family of Cantor sets and the problem of iterations of quadratic mappingsLetters in Mathematical Physics, 1982
- Orthogonal polynomials associated with invariant measures on Julia setsBulletin of the American Mathematical Society, 1982
- Invariant sets under iteration of rational functionsArkiv för Matematik, 1965