Hierarchical Deformation of Locally Rigid Meshes Josiah Manson and Scott Schaefer Texas A&M University.

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Presentation transcript:

Hierarchical Deformation of Locally Rigid Meshes Josiah Manson and Scott Schaefer Texas A&M University

Motivation Simplified control of deformation

Motivation Simplified control of deformation

Motivation Simplified control of deformation No auxiliary control structures

Motivation Simplified control of deformation No auxiliary control structures Fast feedback

Auxiliary Controls Skeletons

Auxiliary Controls [Sederberg and Parry 1986] Grids

Auxiliary Controls [Ju et al. 2005][Joshi et al. 2007] Cages

Intrinsic Controls [Sorkine and Alexa 2007][Botsch et al. 2006] Thin shell simulation

Intrinsic Controls Volumetric simulation [Mezger et al. 2007]

Intrinsic Controls Vibrational modes [Hildebrandt et al. 2012]

Our Solution 1.Simplify the mesh 2.Deform low-resolution mesh 3.Add details back to the mesh 123

Mesh Simplification 1

Edge Collapse Metric Distance to planesDistance to points

Edge Collapse Metric Distance to planesDistance to points

Edge Collapse Metric Distance to planesDistance to points

Edge Collapse Metric Distance to planesDistance to points

Mesh Deformation 2

As-rigid-as-possible Deformation As-rigid-as-possible surface modeling [Sorkine and Alexa 2007]

As-rigid-as-possible Deformation As-rigid-as-possible surface modeling [Sorkine and Alexa 2007] Added ability to satisfy constraints not at mesh vertices

As-rigid-as-possible Deformation

Adding Details 3

Adding Details Constrained Deform local neighborhood before expansion

Adding Details Constrained

Different Transforms RigidSimilarityStretch

Different Transforms Rigid [Arung et al. 1987]

Different Transforms Rigid [Arung et al. 1987]

Different Transforms Rigid [Arung et al. 1987]

Different Transforms Rigid [Arung et al. 1987]

Different Transforms Similarity [Horn 1987]

Different Transforms Stretch

Different Transforms Stretch

Different Transforms Stretch

Different Transforms Stretch

Different Transforms Stretch

Results

Comparison of Methods Original PriMo Thin Shells Gradient Laplacian Rotation Invariant Ours

Convergence Time

Benefits of Simplification

Conclusion Calculate deformation at low resolution Expand to high resolution – As-rigid-as-possible, satisfy constraints – Use a local, symmetric expansion operation Combine with other methods – Different deformation of base mesh – As-similar-as-possible, stretch