Nevanlinna Theoretical Exceptional Sets of Rational Towers and Semigroups

Some Counterexamples in Dynamics of Rational Semigroups

We give an example of two rational functions with non-equal Julia sets that generate a rational semigroup whose completely invariant Julia set is a closed line segment. We also give an example of polynomials with unequal Julia sets that generate a non nearly Abelian polynomial semigroup with the property that the Julia set of one generator is equal to the Julia set of the semigroup. These examp...

On the extension in the Hardy classes and the Nevanlinna class

Using potential theoretic methods we give extension results for functions in various Hardy classes and in the Nevanlinna class in C". Our exceptional sets are polar or slightly larger n-small sets depending whether the majorant is a harmonic or separately hyperharmonic function.

Non-decreasing Functions, Exceptional Sets and Generalised Borel Lemmas

The Borel lemma says that any positive non-decreasing continuous function T satisfies T (r+1/T (r)) ≤ 2T (r) outside of a possible exceptional set of finite linear measure. This lemma plays an important role in the theory of entire and meromorphic functions, where the increasing function T is either the logarithm of the maximum modulus function, or the Nevanlinna characteristic. As a result, ex...

Decidability and Tameness in the Theory of Finite Semigroups

Fq-rational places in algebraic function fields using Weierstrass semigroups

We present a new bound on the number of Fq-rational places in an algebraic function field. It uses information about the generators of theWeierstrass semigroup related to a rational place. As we demonstrate, the bound has implications to the theory of towers of function fields. © 2008 Elsevier B.V. All rights reserved.