Title :
A topological hierarchy for functions on triangulated surfaces
Author :
Bremer, P.-T. ; Hamann, B. ; Edelsbrunner, H. ; Pascucci, V.
Author_Institution :
Dept. of Comput. Sci., California Univ., Davis, CA, USA
Abstract :
We combine topological and geometric methods to construct a multiresolution representation for a function over a two-dimensional domain. In a preprocessing stage, we create the Morse-Smale complex of the function and progressively simplify its topology by cancelling pairs of critical points. Based on a simple notion of dependency among these cancellations, we construct a hierarchical data structure supporting traversal and reconstruction operations similarly to traditional geometry-based representations. We use this data structure to extract topologically valid approximations that satisfy error bounds provided at runtime.
Keywords :
computational geometry; data structures; graph theory; mesh generation; surface fitting; Morse-Smale complex; critical point theory; hierarchical data structure; mesh generation; multiresolution data representation; terrain data; topological hierarchy; triangulated surfaces; Approximation error; Data mining; Data structures; Data visualization; Electrostatics; Focusing; Runtime; Spatial resolution; Topology; Critical point theory; Morse-Smale complex; multiresolution data structure.; simplification; terrain data; Algorithms; Computer Graphics; Image Enhancement; Image Interpretation, Computer-Assisted; Imaging, Three-Dimensional;
Journal_Title :
Visualization and Computer Graphics, IEEE Transactions on
DOI :
10.1109/TVCG.2004.3
