Eremenko's conjecture for functions with real zeros: the role of the minimum modulus

Abstract

We show that for many families of transcendental entire functions f the property that mn(r)∞ as n ∞, for some r>0, where m(r)=\|f(z)|:|z|=r\, implies that the escaping set I(f) of f has the structure of a spider's web. In particular, in this situation I(f) is connected, so Eremenko's conjecture holds. We also give new examples of families of functions for which this iterated minimum modulus condition holds and new families for which it does not hold.