Title :
Efficient Computation of Morse-Smale Complexes for Three-dimensional Scalar Functions
Author :
Gyulassy, A. ; Natarajan, V. ; Pascucci, V. ; Hamann, B.
Author_Institution :
Univ. of California, Davis
Abstract :
The Morse-Smale complex is an efficient representation of the gradient behavior of a scalar function, and critical points paired by the complex identify topological features and their importance. We present an algorithm that constructs the Morse-Smale complex in a series of sweeps through the data, identifying various components of the complex in a consistent manner. All components of the complex, both geometric and topological, are computed, providing a complete decomposition of the domain. Efficiency is maintained by representing the geometry of the complex in terms of point sets.
Keywords :
computational geometry; data structures; data visualisation; topology; Morse-Smale complex; geometry; gradient behavior representation; three-dimensional scalar function; topological data structure; topology-based visualization; Computer science; Computer vision; Data analysis; Data structures; Data visualization; Geometry; Isosurfaces; Surface topography; Topology; Tree graphs; 3D scalar fields; Morse theory; Morse-Smale complexes; computational topology; feature detection; multiresolution; simplification;
Journal_Title :
Visualization and Computer Graphics, IEEE Transactions on
DOI :
10.1109/TVCG.2007.70552
