Add to ORKGAbstract. We prove that the Bergman kernel function associated to a finitely connected domain Ω in the plane is given as a rational combination of only three basic functions of one complex variable: an Alhfors map, its derivative, and one other function whose existence is deduced by means of the field of meromorphic functions on the double of Ω. Because many other functions of conformal mapping and potential theory can be expressed in terms of the Bergman kernel, our results shed light on the complexity of these objects. We also prove that the Bergman kernel is an algebraic function of a single Ahlfors map and its derivative. It follows that many objects of potential theory associated to a multiply connected domain are algebraic if and only...
AbstractWe compute explicitly the Bergman and Szegő kernels for a class of pseudoconvex doma...
We write down explicit algebraic formulas for the Szegő, Garabedian and Bergman kernels for specific...
We write down explicit algebraic formulas for the Szegő, Garabedian and Bergman kernels for specific...
Abstract. We show that the Bergman, Szegő, and Poisson kernels associated to an n-connected domain i...
Abstract. We prove that if either of the Bergman or Szegő kernel functions associated to a multiply ...
Abstract. We shall show that the Szegő and Bergman kernels associated to a finitely connected domain...
AbstractWe show that the classical kernel and domain functions associated to an n-connected domain i...
It is known that the Bergman kernel function associated to a finitely multiply connected domain can ...
Suppose that $\Omega$ is a bounded domain with $C\sp\infty$ smooth boundary in the plane and let $\z...
In this paper we revisit the so-called Bergman kernel method (BKM) for solving confor-mal mapping pr...
Abstract. A streamlined proof that the Bergman kernel associated to a quadrature domain in the plane...
In chapter 2 it is proved that the uniform extendibility of the Bergman kernel is equivalent to a gl...
In this paper we revisit the so-called Bergman kernel method (BKM) for solving confor-mal mapping pr...
In this paper we revisit the so-called Bergman kernel method (BKM) for solving conformal mapping pro...
The construction of reproducing kernel functions is not restricted to real dimension 2. Indeed, the ...
AbstractWe compute explicitly the Bergman and Szegő kernels for a class of pseudoconvex doma...
We write down explicit algebraic formulas for the Szegő, Garabedian and Bergman kernels for specific...
We write down explicit algebraic formulas for the Szegő, Garabedian and Bergman kernels for specific...
Abstract. We show that the Bergman, Szegő, and Poisson kernels associated to an n-connected domain i...
Abstract. We prove that if either of the Bergman or Szegő kernel functions associated to a multiply ...
Abstract. We shall show that the Szegő and Bergman kernels associated to a finitely connected domain...
AbstractWe show that the classical kernel and domain functions associated to an n-connected domain i...
It is known that the Bergman kernel function associated to a finitely multiply connected domain can ...
Suppose that $\Omega$ is a bounded domain with $C\sp\infty$ smooth boundary in the plane and let $\z...
In this paper we revisit the so-called Bergman kernel method (BKM) for solving confor-mal mapping pr...
Abstract. A streamlined proof that the Bergman kernel associated to a quadrature domain in the plane...
In chapter 2 it is proved that the uniform extendibility of the Bergman kernel is equivalent to a gl...
In this paper we revisit the so-called Bergman kernel method (BKM) for solving confor-mal mapping pr...
In this paper we revisit the so-called Bergman kernel method (BKM) for solving conformal mapping pro...
The construction of reproducing kernel functions is not restricted to real dimension 2. Indeed, the ...
AbstractWe compute explicitly the Bergman and Szegő kernels for a class of pseudoconvex doma...
We write down explicit algebraic formulas for the Szegő, Garabedian and Bergman kernels for specific...
We write down explicit algebraic formulas for the Szegő, Garabedian and Bergman kernels for specific...