Vector fields can provide complex structural behavior, especially in turbulent computational fluid dynamics. The topological analysis of these datasets reduces the information but one is usually still left with too many details for interpretation. In this paper, we present a simplification approach that removes pairs of critical points from the dataset, based on relevance measures. In contrast to earlier methods, no grid changes are necessary since the whole method uses small local changes of the vector values defining the vector field. An interpretation in terms of bifurcations underlines the continuous, natural flavor of the algorithm
Vector fields occur in many of the problems in science and engineering. In combustion processes, for...
In this paper we propose a new topology based metric for 2D vector fields. This metric is based on t...
Graduation date: 2010Analysis, visualization, and design of vector fields on surfaces have a wide va...
Vector field simplification aims to reduce the complexity of the flow by removing features in order ...
Summary. Numerical simulations of tubulent flows produce both vector and tensor fields that exhibit ...
The topology of vector fields offers a well known way to show a condensed view of the stream line be...
The topology of vector fields offers a well known way to show a ''condensed'' view of the stream lin...
Visualization of topological information of a vector field can provide useful information on the str...
The visualization of vector fields has attracted much attention over the last decade due to the vast...
In this paper, we present a topological approach for simplifying continuous functions defined on vol...
In this paper, we present a topological approach for simplifying continuous functions defined on vol...
Summary. Vector fields occur in many application domains in science and engineering. In combustion p...
Topological simplification techniques and topology preserving compression approaches for 2D vector f...
A myriad of physical phenomena, such as fluid flows, magnetic fields, and population dynamics are de...
Critical points of vector fields are important topological features, which are characterized by the ...
Vector fields occur in many of the problems in science and engineering. In combustion processes, for...
In this paper we propose a new topology based metric for 2D vector fields. This metric is based on t...
Graduation date: 2010Analysis, visualization, and design of vector fields on surfaces have a wide va...
Vector field simplification aims to reduce the complexity of the flow by removing features in order ...
Summary. Numerical simulations of tubulent flows produce both vector and tensor fields that exhibit ...
The topology of vector fields offers a well known way to show a condensed view of the stream line be...
The topology of vector fields offers a well known way to show a ''condensed'' view of the stream lin...
Visualization of topological information of a vector field can provide useful information on the str...
The visualization of vector fields has attracted much attention over the last decade due to the vast...
In this paper, we present a topological approach for simplifying continuous functions defined on vol...
In this paper, we present a topological approach for simplifying continuous functions defined on vol...
Summary. Vector fields occur in many application domains in science and engineering. In combustion p...
Topological simplification techniques and topology preserving compression approaches for 2D vector f...
A myriad of physical phenomena, such as fluid flows, magnetic fields, and population dynamics are de...
Critical points of vector fields are important topological features, which are characterized by the ...
Vector fields occur in many of the problems in science and engineering. In combustion processes, for...
In this paper we propose a new topology based metric for 2D vector fields. This metric is based on t...
Graduation date: 2010Analysis, visualization, and design of vector fields on surfaces have a wide va...