Faber Polynomials And Poincaré Series

Lattice Paths and Faber Polynomials

The rth Faber polynomial of the Laurent series f(t) = t + f0 + f1/t + f2/t + · · · is the unique polynomial Fr(u) of degree r in u such that Fr(f) = tr + negative powers of t. We apply Faber polynomials, which were originally used to study univalent functions, to lattice path enumeration.

Derivatives of Faber Polynomials and Markov Inequalities

We study asymptotic behavior of the derivatives of Faber polynomials on a set with corners at the boundary. Our results have applications to the questions of sharpness of Markov inequalities for such sets. In particular, the found asymptotics are related to a general Markov-type inequality of Pommerenke and the associated conjecture of Erdős. We also prove a new bound for Faber polynomials on p...

The Faber Polynomials for Circular Sectors

The Faber polynomials for a region of the complex plane, which are of interest as a basis for polynomial approximation of analytic functions, are determined by a conformai mapping of the complement of that region to the complement of the unit disc. We derive this conformai mapping for a circular sector {;: \z\ < 1, |argz| < i/a}, where a > 1, and obtain a recurrence relation for the coefficient...

Faber Polynomials for Rational Mapping Functions

Boundary Singularities of Faber and Fourier Series

Given an analytic Jordan curve with interior G and exterior and given a sequence of complex numbers fang n satisfying lim sup n janj n we consider here three series of the form f z X n anPn z where the polynomials Pn z are chosen to be i the Faber polynomials associated with G ii the polynomials orthogonal over the area of G and iii the polynomials orthogonal over the contour Here we study the ...