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Meshless geometric subdivision

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Title: PowerPoint Author: ywp Last modified by: ywp Created Date: 6/26/2005 12:10:11 PM Document presentation format: Company – PowerPoint PPT presentation

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Title: Meshless geometric subdivision


1
Meshless geometric subdivision
  • By
  • Carsten Moenning
  • Facundo Mémoli
  • Guillermo Sapiro
  • Nira Dyn
  • Neil A. Dodgson
  • IMA Preprint Series 1977
  • (April 2004)

2
Frame
  • Introduction
  • Related work
  • Intrinsic distance mapping across point clouds
  • Intrinsic meshless subdivision
  • Intrinsic point cloud simplification
  • Intrinsic proximity information
  • An intrinsic subdivision operator for point
    clouds
  • Geodesic centroid computation
  • Experimental results

3
Introduction
  • Working with point cloud data directly
  • Replace mesh connectivity by intrinsic proximity
    information
  • Meshless subdivision rules using geodesic
    centroids
  • Main contributions
  • A first meshless geodesic subdivision operator
  • A new method for the computation of geodesic
    weighted averages on manifold surfaces
  • Benefits
  • Not requiring any non-geometric preprocessing
    steps
  • (costly surface reconstruction,simplificatio
    n, potential remeshing )
  • Not vary with the particular type of data (mesh)
    representation used


  • back

4
Related work
  • DYN N., LEVIN D. Subdivision schemes in
    geometric modelling . Acta Numerica 12 (2002),
    73144.
  • LOOP C. Smooth surface subdivision based on
    triangles. In Masters th., Dep. of Math.,
    University of Utah, USA (1987).
  • FLEISHMAN S., COHEN-OR D., ALEXA M., SILVA C. T.
    Progressive point set surfaces. ACM Trans. on
    Comp. Graph. 22, 4 (2003), 9971011.
  • ALEXA M., BEHR J., COHEN-OR D., FLEISHMAN
    S.,LEVIN D., SILVA C. T. Computing and rendering
    point set surfaces. IEEE Trans. on Visual. and
    Comp. Graph.9, 1 (2003), 315.
  • back

5
DL02
  • Subdivision operator S recursively applied to
    control nets
  • of
    arbitrary topology
  • Refinement rule new control vertices are
    inserted and connected
  • Geometric averaging ruleControl vertices are
    repositioned
  • back

6
LOO87
  • Mesh subdivision operator allows for such a
    simple distinction between a topological
    refinement and a geometric averaging rule
    applicable at all points.
  • The refinement rule consists of the insertion of
    a new point at the midpoint of every edge
  • The geometric rule, applicable at all points in
    the new mesh,smoothes the locations of the points
    by weighted averaging of their topological
    neighbours in the refined mesh
  • back

7
FCOAS03
  • back

8
Intrinsic distance mapping across point clouds
  • r-offset
  • then
  • approximated by
  • more details
    FastFPS

9
FastFPS Fast Marching farthest point sampling
  • Voronoi diagrams
  • Farthest point sampling
  • Fast Marching
  • Farthest point sampling for point clouds
  • back

10
Voronoi diagrams
  • The perpendicular bisector
  • The Voronoi cell
  • back

11
Farthest point sampling
  • The point farthest away from the current set
    of sample sites, S, is represented by the centre
    of the largest circle empty of any site si? S.
  • The centre of such a circle is given by a
    vertex of the bounded Voronoi diagram of S,
    BVD(S).
  • back

12
Fast Marching
  • back

13
Farthest point sampling for point clouds
  • back

14
Intrinsic point cloud simplification
  • Simplify any highly dense input P to a base point
    set P0 still sufficiently dense to support
    meaningful geodesic centroid
  • By letting the user control the radius of the
    largest empty circle in the domain of the
    simplified point set
  • back more

15
Intrinsic proximity information
  • In the meshless case mesh connectivity
    information is replaced by local proximity
    information.
  • back

16
An intrinsic subdivision operator for point clouds
  • back

17
Geodesic centroid computation
  • Minimize
  • Back propagation with velocity field
  • back

18
Experimental results
19
Experimental results
  • back
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