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This volume studies the long-term behavior of independent random iterations of Lipschitz transformations on a compact metric space. A random map is said to be mostly contracting if all Lyapunov exponents associated with stationary measures are negative. This requires introducing the notion of (maximal) Lyapunov exponent in this general setting. It is shown that this class is open and satisfies the strong law of large numbers for non-uniquely ergodic systems, a limit theorem for random iterations, the Palis’ global conjecture, and quasi-compactness of the associated annealed Koopman operator. These results yield central limit theorems, large deviations, statistical stability, and continuity and Hölder continuity of Lyapunov exponents. The class includes random products of C¹ diffeomorphisms of the circle, projective actions of locally constant linear cocycles, and finite-state Markov chains. Key tools include generalizations of Kingman’s subadditive ergodic theorem and an exponential local contraction theorem.
Pablo G. Barrientos is an associate professor of mathematics at Universidade Federal Fluminense, Brazil. His research interests are in dynamical systems and ergodic theory, with emphasis on non-hyperbolic dynamics, iterated function systems, random dynamical systems, Lyapunov exponents, and the statistical properties of deterministic and random systems.
Dominique Malicet is an associate professor of mathematics at Université Gustave Eiffel, France and a member of the Laboratoire d’Analyse et de Mathématiques Appliquées. His research lies at the interface of probability, dynamical systems and ergodic theory, including random walks, random dynamical systems in low dimension, group actions, contraction phenomena, Lyapunov exponents, and probabilistic limit theorems.
| Publication Date: | 26 December 2026 |
| Publisher: | Spain MCIN |
| Imprint: | Springer |
| ISBN-13: | 9783032352903 |
| Format: | Paperback softback |