AbstractWe describe a means of computing the uniformizing conformal map from a triangulated surface whose triangles are realized as Euclidean triangles in R3 onto a fundamental domain in the unit disc D, plane C, or sphere S2. Mapping such triangulated surfaces arises in a number of applications, such as conformal brain flattening. We use the circle packing technique of Bowers, Hurdal, Stephenson, et al., to first create a quasiconformal approximation to the conformal map; then we apply a discrete form of conformal welding to reduce the distortion and converge to the conformal map in the limit
We present a new algorithm for conformal mesh parameterization. It is based on a precise notion of d...
We present a new algorithm for conformal mesh parameterization. It is based on a precise notion of d...
Abstract Conformal mapping, a classical topic in complex analysis and differential ge...
In this paper we present a simple method for flattening of triangulated surfaces for mapping and ima...
We introduce a new method for computing conformal transformations of triangle meshes in R^3. Conform...
We discuss several extensions and applications of the theory of discretely conformally equivalent tr...
3D surface classification is a fundamental problem in computer vision and computational geometry. Su...
We introduce a novel method for the construction of discrete conformal mappings from surface meshes ...
With the rapid development of 3D-capture and modeling technologies, a vast number of 3D surface mode...
Quasi-conformal maps have bounded conformal distortion, and are the natural extension of the conform...
We introduce a new method for computing conformal transformations of triangle meshes in ℝ^3. Conform...
©2000 IEEE. Personal use of this material is permitted. However, permission to reprint/republish thi...
3D surface classification is a fundamental problem in computer vision and computational geometry. Su...
Conformal geometry is considered as a fundamental topic in pure mathematics including complex analys...
Abstract. We present a constructive approach for approximating the conformal map (uniformization) of...
We present a new algorithm for conformal mesh parameterization. It is based on a precise notion of d...
We present a new algorithm for conformal mesh parameterization. It is based on a precise notion of d...
Abstract Conformal mapping, a classical topic in complex analysis and differential ge...
In this paper we present a simple method for flattening of triangulated surfaces for mapping and ima...
We introduce a new method for computing conformal transformations of triangle meshes in R^3. Conform...
We discuss several extensions and applications of the theory of discretely conformally equivalent tr...
3D surface classification is a fundamental problem in computer vision and computational geometry. Su...
We introduce a novel method for the construction of discrete conformal mappings from surface meshes ...
With the rapid development of 3D-capture and modeling technologies, a vast number of 3D surface mode...
Quasi-conformal maps have bounded conformal distortion, and are the natural extension of the conform...
We introduce a new method for computing conformal transformations of triangle meshes in ℝ^3. Conform...
©2000 IEEE. Personal use of this material is permitted. However, permission to reprint/republish thi...
3D surface classification is a fundamental problem in computer vision and computational geometry. Su...
Conformal geometry is considered as a fundamental topic in pure mathematics including complex analys...
Abstract. We present a constructive approach for approximating the conformal map (uniformization) of...
We present a new algorithm for conformal mesh parameterization. It is based on a precise notion of d...
We present a new algorithm for conformal mesh parameterization. It is based on a precise notion of d...
Abstract Conformal mapping, a classical topic in complex analysis and differential ge...