Add to ORKGAnother formulation of the existence theorem of canonical (meromorphic) functions on open Riemann surfaces is shown. Geometrically it implies that for given integer n≧max(2g, 1) and a point p of Riemann surface R of genus g(0≦g<∞ there exist a pair of conformal mappings (normalized at pole p) of R to an n-sheeted covering surface with vertical or horizontal slits respectively. Besides, a certain integral formula for locally canonical functions is obtained
Abstract. Any compact Riemann surface has a conformal model in any orientable Riemannian manifold. P...
We extend the results of (Andreev, Daniel, McNicholl preprint) by computing conformal maps onto the ...
Conformal field theories (CFT) represent a framework of fruitful interplay between some of the most ...
Another formulation of the existence theorem of canonical (meromorphic) functions on open Riemann su...
In the theory of the boundary behaviour of canonical conforma,l mappings on open Riemann surfaces, i...
Abstract. We continue the research initiated in [2] on the computability of conformal mapping of mul...
We present a new variational proof of the well-known fact that every Riemannian metric on a two-dime...
When a Riemann surface is defined by identifying boundary arcs of plane re-gions, the process is cal...
This survey article presents the existence and regularity theory for Cartan functionals, i.e., for g...
We provide a simpler proof and slight strengthening of Morrey's famous lemma on $ \varepsilon $-con...
The dependence of the Virasoro-N-point function on the moduli of the Riemann surface is investigated...
AbstractThis article delves into the relation between the deformation theory of finite morphisms to ...
In paper 7) we concerned ourselves with the conformal mapping onto circular-radial slit covering sur...
Let M = M_{g,k} denote the space of properly (Alexandrov) embedded constant mean curvature (CMC) sur...
© 2007 Dr. Armando Jose Rodado Amaris.A genus-two Riemann surface admits a canonical decomposition...
Abstract. Any compact Riemann surface has a conformal model in any orientable Riemannian manifold. P...
We extend the results of (Andreev, Daniel, McNicholl preprint) by computing conformal maps onto the ...
Conformal field theories (CFT) represent a framework of fruitful interplay between some of the most ...
Another formulation of the existence theorem of canonical (meromorphic) functions on open Riemann su...
In the theory of the boundary behaviour of canonical conforma,l mappings on open Riemann surfaces, i...
Abstract. We continue the research initiated in [2] on the computability of conformal mapping of mul...
We present a new variational proof of the well-known fact that every Riemannian metric on a two-dime...
When a Riemann surface is defined by identifying boundary arcs of plane re-gions, the process is cal...
This survey article presents the existence and regularity theory for Cartan functionals, i.e., for g...
We provide a simpler proof and slight strengthening of Morrey's famous lemma on $ \varepsilon $-con...
The dependence of the Virasoro-N-point function on the moduli of the Riemann surface is investigated...
AbstractThis article delves into the relation between the deformation theory of finite morphisms to ...
In paper 7) we concerned ourselves with the conformal mapping onto circular-radial slit covering sur...
Let M = M_{g,k} denote the space of properly (Alexandrov) embedded constant mean curvature (CMC) sur...
© 2007 Dr. Armando Jose Rodado Amaris.A genus-two Riemann surface admits a canonical decomposition...
Abstract. Any compact Riemann surface has a conformal model in any orientable Riemannian manifold. P...
We extend the results of (Andreev, Daniel, McNicholl preprint) by computing conformal maps onto the ...
Conformal field theories (CFT) represent a framework of fruitful interplay between some of the most ...