lecture 9: multiscale bio-modeling and visualization tissue models ii: contouring 3d images
DESCRIPTION
Lecture 9: Multiscale Bio-Modeling and Visualization Tissue Models II: Contouring 3D Images. Chandrajit Bajaj http://www.cs.utexas.edu/~bajaj. Imaging Modalities. Contouring for Models and Visualization. The Isocontour Computation Problem. Input: Scalar Field F defined on a mesh - PowerPoint PPT PresentationTRANSCRIPT
![Page 1: Lecture 9: Multiscale Bio-Modeling and Visualization Tissue Models II: Contouring 3D Images](https://reader036.vdocuments.site/reader036/viewer/2022062816/56814aa3550346895db7b6d4/html5/thumbnails/1.jpg)
Center for Computational VisualizationInstitute of Computational and Engineering SciencesDepartment of Computer Sciences University of Texas at Austin October 2005
Lecture 9: Multiscale Bio-Modeling and Visualization
Tissue Models II: Contouring 3D Images
Chandrajit Bajaj
http://www.cs.utexas.edu/~bajaj
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Center for Computational VisualizationInstitute of Computational and Engineering SciencesDepartment of Computer Sciences University of Texas at Austin October 2005
Imaging Modalities
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Center for Computational VisualizationInstitute of Computational and Engineering SciencesDepartment of Computer Sciences University of Texas at Austin October 2005
Contouring for Models and Visualization
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Center for Computational VisualizationInstitute of Computational and Engineering SciencesDepartment of Computer Sciences University of Texas at Austin October 2005
The Isocontour Computation Problem– Input:
• Scalar Field F defined on a mesh• Multiple Isovalues w in unpredictable order
– Output (for each isovalue w):Contour C(w) = {x | F(x) = w}
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Center for Computational VisualizationInstitute of Computational and Engineering SciencesDepartment of Computer Sciences University of Texas at Austin October 2005
Lower BoundInput size n
m+log(n)Output size m}
Mesh
a1, a2, a3, a4, … , an
Isosurfaceof isovalue ah
a1
a1 a1
a2
a2 a2
a3
a3 a3
The search for ah
takes at least log(n)
an
an an
an
The Isocontour Computation Problem
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Center for Computational VisualizationInstitute of Computational and Engineering SciencesDepartment of Computer Sciences University of Texas at Austin October 2005
Related Work
Search Space
Geometric Value
Con
tour
ing
Stra
tegy
Cel
l by
Cel
lM
esh
Prop
agat
ion
Lorenson/Cline (Marching Cubes)Wilhelms/Van Gelder (octree)
Howie/Blake(propagation)Itoh/Koyamada (extrema graph)
Gallagher(span decomposed into backets)Shen/Johnson (hierachical min-max ranges)
Livnat/Shen/Johnson (kd-tree)Cignoni/Montani/Puppo/Scopigno
van Kreveld
van Kreveld /van Oostrum/Bajaj/Pascucci/Schikore
Shen/Livnat/Johnson/Hansen (LxL lattice)Giles/Haimes (min-sorted ranges)
Bajaj/Pascucci/SchikoreItoh/Yamaguchi/Koyamada (volume thinnig)
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Center for Computational VisualizationInstitute of Computational and Engineering SciencesDepartment of Computer Sciences University of Texas at Austin October 2005
Addtl Related Work (Parallel)
• Temporal CoherenceShen
• View DependentLivnat/Hansen
• AdaptiveZhou/Chen/Kaufman
• Parallel (SIMD)Hansen/Hinker
• Parallel(cluster)Ellsiepen
• Out-of-coreChiang/Silva/Schroeder
• Parallel ray tracingParker/Shirley/Livnat/Hansen/Sloan
• Parallel & Out-of-core-Bajaj/Pascucci/Thompson/Zhang
-Zhang/Bajaj -Zhang/Bajaj/Ramachandran• Temporal-coherence
Sutton/Hansen
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Center for Computational VisualizationInstitute of Computational and Engineering SciencesDepartment of Computer Sciences University of Texas at Austin October 2005
Optimal Single-Resolution Isocontouring
The basic scheme
Preprocessing:
For each cell c in MEnter its range of function values into an interval-tree
(fmin,fmax)
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Center for Computational VisualizationInstitute of Computational and Engineering SciencesDepartment of Computer Sciences University of Texas at Austin October 2005
The basic scheme
Isocontour query W
(fmin,fmax)
For each interval containing W
Compute the portion of isocontour in the corresponding cell
Optimal Single-Resolution Isocontouring
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Center for Computational VisualizationInstitute of Computational and Engineering SciencesDepartment of Computer Sciences University of Texas at Austin October 2005
The basic scheme
Isocontour query W
(fmin,fmax)
Complexity: m + log(n)Optimal but impracticalbecause of the size of theinterval-tree
Optimal Single-Resolution Isocontouring
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Center for Computational VisualizationInstitute of Computational and Engineering SciencesDepartment of Computer Sciences University of Texas at Austin October 2005
Seed Set Optimization
For each connected componentwe need only one cell (and then propagate by adjacency in the mesh)
(fmin,fmax)
Seed Set:a set of cells intersectingevery connected componentof every isocontour
Optimal Single-Resolution Isocontouring
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Center for Computational VisualizationInstitute of Computational and Engineering SciencesDepartment of Computer Sciences University of Texas at Austin October 2005
The basic scheme
Preprocessing(revised):
For each cell c in a Seed SetEnter its range of function values into an interval-tree
(fmin,fmax)
Optimal Single-Resolution Isocontouring
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Center for Computational VisualizationInstitute of Computational and Engineering SciencesDepartment of Computer Sciences University of Texas at Austin October 2005
Seed Set Generation (k seeds from n cells)
• 238 seed cells• 0.01 seconds
Domain Sweep
177 seed cells0.05 seconds
Responsibility Propagation
59 seed cells1.02 seconds
O(n) O(n) O(n log n)O(k) O(k) O(n)
TimeSpace
? ? 2 kmink =Test
Range Sweep
Optimal Single-Resolution Isocontouring
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Center for Computational VisualizationInstitute of Computational and Engineering SciencesDepartment of Computer Sciences University of Texas at Austin October 2005
1872
144.51
715116.24
29356
4.40
720000
17.24
C l i m b P r o p S w e e p C h e c k e r
# C e l l sT i m e (s)
Seed Set Generation
Eagle Pass Terrain 1.4 M total cells
Optimal Single-Resolution Isocontouring
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Center for Computational VisualizationInstitute of Computational and Engineering SciencesDepartment of Computer Sciences University of Texas at Austin October 2005
Contour tree
20
25
0
2520
0
Optimal Single-Resolution Isocontouring
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Center for Computational VisualizationInstitute of Computational and Engineering SciencesDepartment of Computer Sciences University of Texas at Austin October 2005
Minimal Seed SetContour Tree
f
Optimal Single-Resolution Isocontouring
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Center for Computational VisualizationInstitute of Computational and Engineering SciencesDepartment of Computer Sciences University of Texas at Austin October 2005
Minimal Seed SetContour Tree(local minima)
f
Optimal Single-Resolution Isocontouring
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Center for Computational VisualizationInstitute of Computational and Engineering SciencesDepartment of Computer Sciences University of Texas at Austin October 2005
Minimal Seed SetContour Tree
(local maxima)
f
Optimal Single-Resolution Isocontouring
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Center for Computational VisualizationInstitute of Computational and Engineering SciencesDepartment of Computer Sciences University of Texas at Austin October 2005
Minimal Seed Set Contour Tree
fEach seed cell corresponds to a
monotonic path on the contour tree
Optimal Single-Resolution Isocontouring
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Center for Computational VisualizationInstitute of Computational and Engineering SciencesDepartment of Computer Sciences University of Texas at Austin October 2005
Minimal Seed Set Contour Tree
f
For a minimal seed set each seed cell corresponds to a path that is not
covered by any over seed cell
Optimal Single-Resolution Isocontouring
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Center for Computational VisualizationInstitute of Computational and Engineering SciencesDepartment of Computer Sciences University of Texas at Austin October 2005
Minimal Seed Set Contour Tree
f
Current isovalue
Each connected component of any isocontour corresponds exactly to
one point of the contour tree
Optimal Single-Resolution Isocontouring
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Center for Computational VisualizationInstitute of Computational and Engineering SciencesDepartment of Computer Sciences University of Texas at Austin October 2005
Range sweep
Optimal Single-Resolution Isocontouring
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Center for Computational VisualizationInstitute of Computational and Engineering SciencesDepartment of Computer Sciences University of Texas at Austin October 2005
• The number of seeds selected is the minimum plus the number of local minima.
Optimal Single-Resolution Isocontouring
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Center for Computational VisualizationInstitute of Computational and Engineering SciencesDepartment of Computer Sciences University of Texas at Austin October 2005
Optimal Single-Resolution Isocontouring
Seed set of a 3D scalar field
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Center for Computational VisualizationInstitute of Computational and Engineering SciencesDepartment of Computer Sciences University of Texas at Austin October 2005
Quantitative Analysis I
• Consider a terrain of which you want to compute the length of each isocontour and the area contained inside each isocontour.
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Center for Computational VisualizationInstitute of Computational and Engineering SciencesDepartment of Computer Sciences University of Texas at Austin October 2005
The length of each contour is a c0 spline function.
The area inside/outside each isocontour is a C1 spline function.
Quantitative Analysis II(signature computation)
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Center for Computational VisualizationInstitute of Computational and Engineering SciencesDepartment of Computer Sciences University of Texas at Austin October 2005
• In general the size of each isocontour of a scalar field of dimension d is a spline function of d-2 continuity.
• The size of the region inside/outside is given by a spline function of d-1 continuity
Quantitative Analysis III(signature computation)
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Center for Computational VisualizationInstitute of Computational and Engineering SciencesDepartment of Computer Sciences University of Texas at Austin October 2005
The Contour Spectrum
– The horizontal axis spans the scalar values
– Plot of a set of signatures (length, area, gradient ...) as functions of the scalar value .
• Vertical axis spans normalized ranges of each signature.
• White vertical bars mark current selected isovalues.
Graphical User Interface for Static Data
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Center for Computational VisualizationInstitute of Computational and Engineering SciencesDepartment of Computer Sciences University of Texas at Austin October 2005
The horizontal axis spans the scalar value dimension The vertical axis spans the time dimension t
The Contour SpectrumGraphical User Interface for time varying data
(,t ) --> c
The color c is mapped to the magnitude of a signature function of time t and isovalue
t
c
low
high
magnitude
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Center for Computational VisualizationInstitute of Computational and Engineering SciencesDepartment of Computer Sciences University of Texas at Austin October 2005
Spectrum-based Contouring (CT scan of an engine model)
• The contour spectrum allows the development of an adaptive ability to separate interesting isovalues from the others.
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Center for Computational VisualizationInstitute of Computational and Engineering SciencesDepartment of Computer Sciences University of Texas at Austin October 2005
Spectrum-based Contouring (foot of the Visible Human)
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Center for Computational VisualizationInstitute of Computational and Engineering SciencesDepartment of Computer Sciences University of Texas at Austin October 2005
Visualization of Electrostatic Potential(a view inside the data)
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Center for Computational VisualizationInstitute of Computational and Engineering SciencesDepartment of Computer Sciences University of Texas at Austin October 2005
Progressive Isocontouring of Images
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Center for Computational VisualizationInstitute of Computational and Engineering SciencesDepartment of Computer Sciences University of Texas at Austin October 2005
cascaded cascaded multi-resolutionmulti-resolution on-lineon-line algorithmsalgorithms
Mesh Refinement Isocontourin
gDisplay
Progressive Isocontouring
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Center for Computational VisualizationInstitute of Computational and Engineering SciencesDepartment of Computer Sciences University of Texas at Austin October 2005
• Input: – hierarchical mesh (e.g. generated by edge bisection)
– an isovalue
• Output: – a hierarchical representation of the required isosurface
– the input mesh must be traversed from the coarse level to the fine level
– as the input mesh is partially traversed the output contour hierarchy must be generated
Progressive Isocontouring
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Center for Computational VisualizationInstitute of Computational and Engineering SciencesDepartment of Computer Sciences University of Texas at Austin October 2005
Edge Bisection
Progressive Isocontouring
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Center for Computational VisualizationInstitute of Computational and Engineering SciencesDepartment of Computer Sciences University of Texas at Austin October 2005
• Local refinement:only the cells incident to the split edge are refined.
• Adaptivity without “temporary” subdivision.
Progressive Isocontouring
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Center for Computational VisualizationInstitute of Computational and Engineering SciencesDepartment of Computer Sciences University of Texas at Austin October 2005
The 1D case
isovalue
isovalue
Progressive Isocontouring
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Center for Computational VisualizationInstitute of Computational and Engineering SciencesDepartment of Computer Sciences University of Texas at Austin October 2005
2D case16 cases can be reduced immediately to 8 by +/- symmetry
(1)
(2’)
(2)
(4’)
(3) (4)
(5) (1’)
+
+
+
-
Progressive Isocontouring
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Center for Computational VisualizationInstitute of Computational and Engineering SciencesDepartment of Computer Sciences University of Texas at Austin October 2005
• Vertex Move
Vertex MoveVertex SplitVertex Split
Vertex MoveVertex Split
Vertex SplitVertex Split
(1) (1) (2) (3)
Progressive Isocontouring
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Center for Computational VisualizationInstitute of Computational and Engineering SciencesDepartment of Computer Sciences University of Texas at Austin October 2005
• Vertex Split
Vertex SplitVertex SplitVertex Split
New Loop Edge FlipVertex SplitVertex Split
(4) (4) (5) (3)
Progressive Isocontouring
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Center for Computational VisualizationInstitute of Computational and Engineering SciencesDepartment of Computer Sciences University of Texas at Austin October 2005
Vertex MoveVertex SplitVertex Split
Vertex Move
Progressive Isocontouring
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Center for Computational VisualizationInstitute of Computational and Engineering SciencesDepartment of Computer Sciences University of Texas at Austin October 2005
Vertex MoveVertex Split
Vertex SplitVertex Split
Progressive Isocontouring
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Center for Computational VisualizationInstitute of Computational and Engineering SciencesDepartment of Computer Sciences University of Texas at Austin October 2005
Vertex Split
New LoopVertex Split
Progressive Isocontouring
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Center for Computational VisualizationInstitute of Computational and Engineering SciencesDepartment of Computer Sciences University of Texas at Austin October 2005
Vertex FlipVertex Flip
Vertex SplitVertex SplitVertex Split
Progressive Isocontouring
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Center for Computational VisualizationInstitute of Computational and Engineering SciencesDepartment of Computer Sciences University of Texas at Austin October 2005
Progressive Isocontouring
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Center for Computational VisualizationInstitute of Computational and Engineering SciencesDepartment of Computer Sciences University of Texas at Austin October 2005
Progressive Isocontouring
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Center for Computational VisualizationInstitute of Computational and Engineering SciencesDepartment of Computer Sciences University of Texas at Austin October 2005
Progressive Isocontouring
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Center for Computational VisualizationInstitute of Computational and Engineering SciencesDepartment of Computer Sciences University of Texas at Austin October 2005
Higher Order Contouring with A-patches
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Center for Computational VisualizationInstitute of Computational and Engineering SciencesDepartment of Computer Sciences University of Texas at Austin October 2005
A-patches in BB-form
• Given tetrahedron vertices pi=(xi,yi,zi), i=1,2,3,4, is barycentric coordinates of p=(x,y,z) :
• function f(p) of degree n can be expressed in Bernstein-Bezier form :
• Algebraic surface patch(A-patch) within the tet is defined as f(p)=0.
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Center for Computational VisualizationInstitute of Computational and Engineering SciencesDepartment of Computer Sciences University of Texas at Austin October 2005
High Order Contouring using A-patches
<cube> <tetrahedron>
<triangular prism> <square pyramid>
• Implicit form of Isocontour : f(x,y,z) = w
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Center for Computational VisualizationInstitute of Computational and Engineering SciencesDepartment of Computer Sciences University of Texas at Austin October 2005
Marching Cubes• Piecewise linear approximation of an isosurface
• Visit and Triangulate Each Cells based on a Table
• Triangulation Table (256 15 cases)
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Center for Computational VisualizationInstitute of Computational and Engineering SciencesDepartment of Computer Sciences University of Texas at Austin October 2005
Better Approximation
• Topological accuracy – Decided by saddle point values
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Center for Computational VisualizationInstitute of Computational and Engineering SciencesDepartment of Computer Sciences University of Texas at Austin October 2005
31 Cases
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Center for Computational VisualizationInstitute of Computational and Engineering SciencesDepartment of Computer Sciences University of Texas at Austin October 2005
Better Approximation• Better appoximation of trilinear interpolant
– Adding shoulder and inflection points
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Center for Computational VisualizationInstitute of Computational and Engineering SciencesDepartment of Computer Sciences University of Texas at Austin October 2005
High Order Contouring with A-patches
(a) Scattered points (b) Octree subdivision function interpolation(c) Piecewise polynomial approximation(d) Reconstructed scalar fields
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Center for Computational VisualizationInstitute of Computational and Engineering SciencesDepartment of Computer Sciences University of Texas at Austin October 2005
Dual Contouring
• Primal Contouring vs Dual Contouring
Primal contour Dual Contour
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Center for Computational VisualizationInstitute of Computational and Engineering SciencesDepartment of Computer Sciences University of Texas at Austin October 2005
Dual Contouring
• Polygons with better aspect ratio
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Center for Computational VisualizationInstitute of Computational and Engineering SciencesDepartment of Computer Sciences University of Texas at Austin October 2005
Adaptive Dual Contouring
• Feature preservation
Normal adaptive isocontouring
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Center for Computational VisualizationInstitute of Computational and Engineering SciencesDepartment of Computer Sciences University of Texas at Austin October 2005
Further Reading• Fast Isocontouring for Improved Interactivity
Proceedings: ACM Siggraph/IEEE Symposium on Volume Visualization, ACM Press, (1996), San Francisco, CA
• A. Lopes, K. Brodlie, “Improving the Robustness and Accuracy of the Marching Cubes Algorithm for Isosurfacing”, TVCG
• Tao Ju, Frank Losasso, Scott Schaefer, Joe Warren , “Dual Contouring of Hermite Data”, SIGGRAPH 2002
• Leif P. Kobbelt, Mario Botsch, Ulrich Schwanecke, Hans-Peter Seidel, “Feature Sensitive Surface Extraction from Volume Data”, SIGGRAPH 2001
• Z. Wood, M. Desbrun, P. Schröder and D.E. Breen, “Semi-Regular Mesh Extraction from Volumes”, IEEE Visualization 2000
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Center for Computational VisualizationInstitute of Computational and Engineering SciencesDepartment of Computer Sciences University of Texas at Austin October 2005
Further Reading (contd)• The Contour Spectrum
Proceedings of the 1997 IEEE Visualization Conference,167-173, October 1997 Phoeniz, Arizona.
• Contour Trees and Small Seed Sets for Isosurface Traversal, In Proceedings Thirtheen ACM Symposium on Computational Geometry (Theory Track), (Nice, France, June 4-6, (1997), ACM Press, pp. 212-219
• “Modeling Physical Fields for Interrogative Data Visualization”, 7th IMA Conference on the Mathematics of Surfaces, The Mathematics of Surfaces VII, edited by T.N.T. Goodman and R. Martin, Oxford University Press, (1997).
• Parallel and Out-of-core View-dependent Isocontour Visualization Using Random Data Distribution Joint Eurographics-IEEE TCVG Symposium on Visualization 2002, pages 9-18
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Center for Computational VisualizationInstitute of Computational and Engineering SciencesDepartment of Computer Sciences University of Texas at Austin October 2005
Isosurface Tracking
Isosurface component tracking - traces and updates the movement and topology changes
of an isosurface component in time-varying fields.
Tracking smooth evolution of an isosurface
Tracking isosurface topology changes over time
Efficiency : I/O optimization , delta seedset.
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Center for Computational VisualizationInstitute of Computational and Engineering SciencesDepartment of Computer Sciences University of Texas at Austin October 2005
• Temporal Propagation– Given an isosurface component Ct at time t,– Track the movement of Ct – Construct the isosurface component Ct’ at time
t’=t+Dt
above isovalue below isovalue
Isosurface Tracking
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Center for Computational VisualizationInstitute of Computational and Engineering SciencesDepartment of Computer Sciences University of Texas at Austin October 2005
• Smooth animation of time dependent isosurfaces
t=0 t=1t=0.6t=0.3
Marching thru time
Isosurface Tracking
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Center for Computational VisualizationInstitute of Computational and Engineering SciencesDepartment of Computer Sciences University of Texas at Austin October 2005
• I/O optimization – load and process only necessary data blocks
Isosurface Tracking
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Center for Computational VisualizationInstitute of Computational and Engineering SciencesDepartment of Computer Sciences University of Texas at Austin October 2005
• Isocontour Topology Tracking
• create• disappear• merge• split
Topology Change
Visualization of time-dependent isosurfaces • Connecting the centroid of each component
• topology change and the movement direction of the surface.
Isosurface Tracking
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Center for Computational VisualizationInstitute of Computational and Engineering SciencesDepartment of Computer Sciences University of Texas at Austin October 2005
• Isocontour Topology Tracking
Isosurface Tracking