Characterization of random mappings

We discuss the characterization of chaotic behaviors in random maps both in terms of the Lyapunov exponent and of the spectral properties of the Perron-Frobenius operator. In particular, we study a logistic map where the control parameter is extracted at random at each time step by considering finit

V 2 = L, into itself assigns independently to each i ∈ V 1 its unique image j ∈ V 2 with probability 1/L and to each i ∈ V 2 its unique image j ∈ V 1 with probability 1/K. We study the connected component structure of a random digraph G T K L , representing T K L , as K → ∞ and L → ∞. We show that,

We prove a "random" version of a natural statement about countable set-mappings and use this to consider two problems, one from measure theory (Fremlin, 1993, DV) and one from topology (Arkhangel'skii, 1978, Problem 17).