A pair of stream functions for three-dimensional vortex flows
Zeitschrift für Angewandte Mathematik und Physik (ZAMP)
Visualizing Unstructured Flow Data Using Dual Stream Functions
IEEE Transactions on Visualization and Computer Graphics
Out-of-Core Streamline Visualization on Large Unstructured Meshes
IEEE Transactions on Visualization and Computer Graphics
Automatic Vortex Core Detection
IEEE Computer Graphics and Applications
A 3-D streamline tracking algorithm using dual stream functions
VIS '92 Proceedings of the 3rd conference on Visualization '92
Topological Segmentation in Three-Dimensional Vector Fields
IEEE Transactions on Visualization and Computer Graphics
Topological Methods for 2D Time-Dependent Vector Fields Based on Stream Lines and Path Lines
IEEE Transactions on Visualization and Computer Graphics
Clifford Fourier Transform on Vector Fields
IEEE Transactions on Visualization and Computer Graphics
Intelligent Feature Extraction and Tracking for Visualizing Large-Scale 4D Flow Simulations
SC '05 Proceedings of the 2005 ACM/IEEE conference on Supercomputing
Dual stream function visualization of flows fields dependent on two variables
Computing and Visualization in Science
NIH-NSF Visualization Research Challenges Report Summary
IEEE Computer Graphics and Applications
Visualization's Role in Analyzing Computational Fluid Dynamics Data
IEEE Computer Graphics and Applications
Three-dimensional flow characterization using vector pattern matching
IEEE Transactions on Visualization and Computer Graphics
A turbulent Eulerian multi-fluid model for homogeneous nucleation of water vapour in transonic flow
International Journal of Computational Fluid Dynamics
| Hi-index | 0.00 |
A review of CFD visualisation methods together with policy statements by visualisation experts conclude that the visualisation of complex 3D and 4D CFD data fields is still a major research challenge. Potential methodologies are discussed and it is suggested that a suitable approach and target for research is to understand how derived scalar and vector fields, such as dual stream functions and the Lamb vector, relate to the structure and physical characteristics of a flow. A particular focus is to use these fields to generate 'structural' stream functions with isosurfaces that divide the flow into self contained regions.