Boundaries of escaping Fatou components
Abstract
Let f be a transcendental entire function and U be a Fatou component of f. We show that if U is an escaping wandering domain of f, then most boundary points of U (in the sense of harmonic measure) are also escaping. In the other direction we show that if enough boundary points of U are escaping, then U is an escaping Fatou component. Some applications of these results are given; for example, if I(f) is the escaping set of f, then I(f)\∞\ is connected.
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