Add to ORKGA method is described for the computation of the Green's function in the complex plane corresponding to a set of K symmetrically placed polygons along the real axis. An important special case is a set of K real intervals. The method is based on a Schwarz-Christoffel conformal map of the part of the upper half-plane exterior to the problem domain onto a semi-infinite strip whose end contains K-1 slits. From the Green's function one can obtain a great deal of information about polynomial approximations, with applications in digital filters and matrix iteration. By making the end of the strip jagged, the method can be generalised to weighted Green's functions and weighted approximations
The method of boundary curve reparametrization is generalized to the case of multiply connected doma...
This paper presents a fast boundary integral equation method with for computing conformal mappings o...
Thesis (Ph.D.)--Wichita State University, College of Liberal Arts and Sciences, Dept. of Mathematics...
A method is described for the computation of the Green's function in the complex plane corresponding...
Conformal maps are functions from subsets of the complex plane to the complex plane that locally pre...
© 2017, Allerton Press, Inc.We propose a formula for the conformalmapping of the upper half-plane on...
Thesis (Ph.D.)-- Wichita State University, Fairmount College of Liberal Arts and Sciences, Dept. of ...
We propose a new algorithm for computing the Riemann mapping of the unit disk to a polygon, also kno...
AbstractNumerical conformal mapping methods for regions with a periodic boundary have been developed...
Few analytical techniques are better known to students of applied mathematics than conformal mapping...
Click on the DOI link to access the article (may not be free)A Schwarz-Christoffel mapping formula i...
By exploiting conformal maps to vertically slit regions in the complex plane, a recently developed r...
This paper is concerned with the problem of determining approximations to the function F which maps ...
summary:By using Schwarz-Christoffel theorem the author deduces the conformal mapping of a halfplane...
summary:By using Schwarz-Christoffel theorem the author deduces the conformal mapping of a halfplane...
The method of boundary curve reparametrization is generalized to the case of multiply connected doma...
This paper presents a fast boundary integral equation method with for computing conformal mappings o...
Thesis (Ph.D.)--Wichita State University, College of Liberal Arts and Sciences, Dept. of Mathematics...
A method is described for the computation of the Green's function in the complex plane corresponding...
Conformal maps are functions from subsets of the complex plane to the complex plane that locally pre...
© 2017, Allerton Press, Inc.We propose a formula for the conformalmapping of the upper half-plane on...
Thesis (Ph.D.)-- Wichita State University, Fairmount College of Liberal Arts and Sciences, Dept. of ...
We propose a new algorithm for computing the Riemann mapping of the unit disk to a polygon, also kno...
AbstractNumerical conformal mapping methods for regions with a periodic boundary have been developed...
Few analytical techniques are better known to students of applied mathematics than conformal mapping...
Click on the DOI link to access the article (may not be free)A Schwarz-Christoffel mapping formula i...
By exploiting conformal maps to vertically slit regions in the complex plane, a recently developed r...
This paper is concerned with the problem of determining approximations to the function F which maps ...
summary:By using Schwarz-Christoffel theorem the author deduces the conformal mapping of a halfplane...
summary:By using Schwarz-Christoffel theorem the author deduces the conformal mapping of a halfplane...
The method of boundary curve reparametrization is generalized to the case of multiply connected doma...
This paper presents a fast boundary integral equation method with for computing conformal mappings o...
Thesis (Ph.D.)--Wichita State University, College of Liberal Arts and Sciences, Dept. of Mathematics...