Add to ORKGMany scientific fields generate data in three-dimensional space. These fields include fluid dynamics, medical imaging, and X-ray crystallography. In all contexts, a common difficulty exists: how best to represent the data visually and analytically. One approach involves generating level sets: two-dimensional surfaces consisting of all points with a given value in the space. With large datasets common, efficient generation of these level sets is critical. Several methods exist: one such is the contour tree approach used by van Kreveld et al. [26]. This thesis extends the results of van Kreveld et al. [26] and Tarasov & Vyalyi [23]. An efficient algorithm for generating contour trees in any number of dimensions is presented, followe...
A general scheme for computing contours of trivariate data is discussed. It is assumed that three-d...
AbstractContour trees are used when high-dimensional data are preprocessed for efficient extraction ...
We revisit the classical problem of computing the contour tree of a scalar field f:M to R, where M i...
Many scientific fields generate data in three-dimensional space. These fields include fluid dynamic...
Tarasov & Vyalyi [1] propose an O(n log n) algorithm for computing contour trees over 3-dimensio...
A new algorithm to construct contour trees is introduced which improves the runtime of known approa...
AbstractWe show that contour trees can be computed in all dimensions by a simple algorithm that merg...
We show that contour trees can be computed in all dimensions by a simple algorithm that merges two t...
We show that contour trees can be computed in all dimensions by a simple algorithm that merges two t...
textData visualization techniques use computational modeling and rendering methods to aid scientifi...
In this thesis I discuss the application of two topological structures to scientific visualization. ...
For 2D or 3D meshes that represent a continuous function to the reals, the contours -- or isosurface...
Consider a scalar field f: M 7 → R, where M is a triangulated simplicial mesh in Rd. A level set, or...
The contour tree is a topological structure associated with a scalar function that tracks the connec...
Contour trees are extensively used in scalar field analysis. The contour tree is a data structure th...
A general scheme for computing contours of trivariate data is discussed. It is assumed that three-d...
AbstractContour trees are used when high-dimensional data are preprocessed for efficient extraction ...
We revisit the classical problem of computing the contour tree of a scalar field f:M to R, where M i...
Many scientific fields generate data in three-dimensional space. These fields include fluid dynamic...
Tarasov & Vyalyi [1] propose an O(n log n) algorithm for computing contour trees over 3-dimensio...
A new algorithm to construct contour trees is introduced which improves the runtime of known approa...
AbstractWe show that contour trees can be computed in all dimensions by a simple algorithm that merg...
We show that contour trees can be computed in all dimensions by a simple algorithm that merges two t...
We show that contour trees can be computed in all dimensions by a simple algorithm that merges two t...
textData visualization techniques use computational modeling and rendering methods to aid scientifi...
In this thesis I discuss the application of two topological structures to scientific visualization. ...
For 2D or 3D meshes that represent a continuous function to the reals, the contours -- or isosurface...
Consider a scalar field f: M 7 → R, where M is a triangulated simplicial mesh in Rd. A level set, or...
The contour tree is a topological structure associated with a scalar function that tracks the connec...
Contour trees are extensively used in scalar field analysis. The contour tree is a data structure th...
A general scheme for computing contours of trivariate data is discussed. It is assumed that three-d...
AbstractContour trees are used when high-dimensional data are preprocessed for efficient extraction ...
We revisit the classical problem of computing the contour tree of a scalar field f:M to R, where M i...