The contour tree is a topological structure associated with a scalar function that tracks the connectivity of the evolving level sets of the function. It supports intuitive and interactive visual exploration and analysis of the scalar function. This paper describes a fast, parallel, and memory efficient algorithm for constructing the contour tree of a scalar function on shared memory systems. Comparisons with existing implementations show significant improvement in both the running time and the memory expended. The proposed algorithm is particularly suited for large datasets that do not fit in memory. For example, the contour tree for a scalar function defined on a 8.6 billion vertex domain (2048 x 2048 x 2048 volume data) can be efficientl...
We show that contour trees can be computed in all dimensions by a simple algorithm that merges two t...
AbstractWe show that contour trees can be computed in all dimensions by a simple algorithm that merg...
Tarasov & Vyalyi [1] propose an O(n log n) algorithm for computing contour trees over 3-dimensio...
The contour tree is a topological abstraction of a scalar field that captures evolution in level set...
As data sets grow to exascale, automated data analysis and visualization are increasingly important,...
Contour trees are used for topological data analysis in scientific visualization. While originally c...
As data sets increase in size beyond the petabyte, it is increasingly important to have automated me...
As data sets grow to exascale, automated data analysis and visualisation are increasingly important,...
Contour trees are extensively used in scalar field analysis. The contour tree is a data structure th...
Consider a scalar field f: M 7 → R, where M is a triangulated simplicial mesh in Rd. A level set, or...
The Reeb graph of a scalar function tracks the evolution of the topology of its level sets. This pap...
International audienceThis paper presents a new algorithm for the fast, shared memory, multi-core co...
A new algorithm to construct contour trees is introduced which improves the runtime of known approa...
As data sets grow to exascale, automated data analysis and visu- alisation are increasingly importan...
We revisit the classical problem of computing the contour tree of a scalar field f:M to R, where M i...
We show that contour trees can be computed in all dimensions by a simple algorithm that merges two t...
AbstractWe show that contour trees can be computed in all dimensions by a simple algorithm that merg...
Tarasov & Vyalyi [1] propose an O(n log n) algorithm for computing contour trees over 3-dimensio...
The contour tree is a topological abstraction of a scalar field that captures evolution in level set...
As data sets grow to exascale, automated data analysis and visualization are increasingly important,...
Contour trees are used for topological data analysis in scientific visualization. While originally c...
As data sets increase in size beyond the petabyte, it is increasingly important to have automated me...
As data sets grow to exascale, automated data analysis and visualisation are increasingly important,...
Contour trees are extensively used in scalar field analysis. The contour tree is a data structure th...
Consider a scalar field f: M 7 → R, where M is a triangulated simplicial mesh in Rd. A level set, or...
The Reeb graph of a scalar function tracks the evolution of the topology of its level sets. This pap...
International audienceThis paper presents a new algorithm for the fast, shared memory, multi-core co...
A new algorithm to construct contour trees is introduced which improves the runtime of known approa...
As data sets grow to exascale, automated data analysis and visu- alisation are increasingly importan...
We revisit the classical problem of computing the contour tree of a scalar field f:M to R, where M i...
We show that contour trees can be computed in all dimensions by a simple algorithm that merges two t...
AbstractWe show that contour trees can be computed in all dimensions by a simple algorithm that merg...
Tarasov & Vyalyi [1] propose an O(n log n) algorithm for computing contour trees over 3-dimensio...