Given two surfaces with the same topology, a bijective mapping between them exists. On triangular mesh surfaces, the problem of computing this mapping is called mesh parameterization. The parameter domain is the surface that the mesh is mapped onto.
Parameterization was mainly used for mapping textures to surfaces. Recently, it has become a powerful tool for many applications in mesh processing.[citation needed] Various techniques are developed for different types of parameter domains with different parameterization properties.
Applications
edit- Texture mapping
- Normal mapping
- Detail transfer
- Morphing
- Mesh completion
- Mesh Editing
- Mesh Databases
- Remeshing
- Surface fitting
Techniques
edit- Barycentric Mappings
- Differential Geometry Primer
- Non-Linear Methods
Implementations
edit- A fast and simple stretch-minimizing mesh parameterization
- Graphite: ABF++, LSCM, Spectral LSCM
- Linear discrete conformal parameterization
- Discrete Exponential Map
- Boundary First Flattening
- Scalable Locally Injective Mappings
- Triangulated Surface Mesh Parameterization, a chapter of CGAL, the Computational Geometry Algorithms Library
See also
editExternal links
edit
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