Measurable entire functions II
Abstract
Let E denote the space of entire functions with the topology of uniform convergence on compact sets. The action of C by translations on E is defined by Tzf(w) = f(w+z). Let U denote the set of entire functions whose orbit under T is dense. Birkhoff showed, in [B], that U is not empty. One of the problems in the collection by T-C Dinh and N. Sibony [DS] asks whether there exists an invariant probability measure on E whose support is contained in U. We will show how an old construction of the second author can be modified to provide a positive answer to their question. Furthermore, we modify the construction to produce a wealth of ergodic measures on the space of entire functions of several complex variables.
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