The problem of the generation of homogeneous grids for spherical domains is considered in the class of conformal conic mappings. The equivalence between secant and tangent projections is shown and splitting the set of conformal conic mappings into equivalence classes is presented. The problem of minimization of the mapping factor variation is solved in the class of conformal conic mappings. Obtained results can be used in applied sciences, such as geophysical fluid dynamics and cartography, where the flattening of the Earth surface is required
It is demonstrated by analyses and by numerical illustrations that any arbitrarily prescribed contou...
We develop a framework for deriving governing partial differential equations for variational problem...
Space conformal problems in the mean mapping and variation problems are considered in the paper aimi...
AbstractA simple geometric condition that defines the class of classical (stereographic, conic and c...
In books and textbooks on map projections, cylindrical, conic and azimuthal projections are usually ...
This paper describes an approach of representing 3D shape by using a set of invariant spherical harm...
This Demonstration shows the image of a grid in the plane under a selection of conformal mappings. Y...
This article deals with the study of some properties of immersed curves in the conformal sphere Q(n)...
This paper treats conformal mapping as it relates to the generation of grids to be used for flow sim...
It is rarely taught in an undergraduate or even graduate curriculum that the only conformal maps in ...
AbstractThe generation of computational grids is an important component contributing to the efficien...
This is a report on conformal mapping of the interior of a unit circle on to the interior of a class...
This article deals with the study of some properties of immersed curves in the conformal sphere Q(n)...
The purpose of this thesis is to give a simple interpretation of conformal mapping by some functions...
Conformal mappings of plane domains are realized by holomorphic functions with non vanishing derivat...
It is demonstrated by analyses and by numerical illustrations that any arbitrarily prescribed contou...
We develop a framework for deriving governing partial differential equations for variational problem...
Space conformal problems in the mean mapping and variation problems are considered in the paper aimi...
AbstractA simple geometric condition that defines the class of classical (stereographic, conic and c...
In books and textbooks on map projections, cylindrical, conic and azimuthal projections are usually ...
This paper describes an approach of representing 3D shape by using a set of invariant spherical harm...
This Demonstration shows the image of a grid in the plane under a selection of conformal mappings. Y...
This article deals with the study of some properties of immersed curves in the conformal sphere Q(n)...
This paper treats conformal mapping as it relates to the generation of grids to be used for flow sim...
It is rarely taught in an undergraduate or even graduate curriculum that the only conformal maps in ...
AbstractThe generation of computational grids is an important component contributing to the efficien...
This is a report on conformal mapping of the interior of a unit circle on to the interior of a class...
This article deals with the study of some properties of immersed curves in the conformal sphere Q(n)...
The purpose of this thesis is to give a simple interpretation of conformal mapping by some functions...
Conformal mappings of plane domains are realized by holomorphic functions with non vanishing derivat...
It is demonstrated by analyses and by numerical illustrations that any arbitrarily prescribed contou...
We develop a framework for deriving governing partial differential equations for variational problem...
Space conformal problems in the mean mapping and variation problems are considered in the paper aimi...