Related Work

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Title: Related Work

1
Related Work

Bergman, Rogowitz, and Treinish(1995) - enhancing
colormapped visualiztion.
Rosenfeld and Kak(1982) - Histogram equalization
Gershon(1992) - Generalized Animation
Jones and Chen(1994), Lorensen and Cline(1987),
Wilhelms and Gelder(1990) - isocontours in 2d and
3d scalar data.
Fowler and Little(1979) - Detecting
ridges and valleys.
McCormack, Gahegan, Roberts, Hogg, Hoyle(1993) -
detecting drainage patterns in geographic
terrain.
Interrante, Fuchs, and Pizer(1995) - Surfaces.
Itoh and Koyamada(1994) - Isocontour extraction.
Helman and Hesselink(1991) - vector field
topology.
Bader(1990)- gradient fields in molecular systems.

2
Scalar Topology

3
Construction of Scalar Topology

4
Classification of Critical Points
5
Tracing Critical Curves

Four critical curves are computed for each saddle
point, two in the direction corresponding to the
positive eigenvalue, and two in the direction
corresponding to the negative eigenvalue.

6
Some Applications

Data Correlation - Due in part to the invariance
under translation and scaling, scalar topology is
useful in visually determing linear correlation
between multiple scalar variables.
Image Co-registration - Scalar topology in
adjacent planes provides a bacbone which may be
used to aling the planes.
Warping/Morphing - Editing of the scalar backbone
may be used to apply a warping effect to an
image, or to warp between the backbones of two
similar images.
Mesh Reduction - The scalar topology may server
as a guide to aid in computation of reduced
resolution meshes.
Surface Triangulation - Adaptive triangulation of
arbitrary mathematical surfaces by decomposition
into montonic patches which may be subdivided to
an arbitrary precision.
Surface Reconstruction - Adaptive Triangulation
of Space.