Reconstruction of surfaces with ordinary singularities from their silhouettes

10/12/2018

∙

We present algorithms for reconstructing, up to unavoidable projective automorphisms, surfaces with ordinary singularities in three dimensional space starting from their silhouette, or "apparent contour" - namely the branching locus of a projection on the plane - and the projection of their singular locus.

READ FULL TEXT

Reconstruction of surfaces with ordinary singularities from their silhouettes

Reconstruction of rational ruled surfaces from their silhouettes

On the computability of the Fréchet distance of surfaces in the bit-model of real computation

Optimal Bounds for Johnson-Lindenstrauss Transformations

Computing the intersection of two quadrics through projection and lifting

A generalized projection iterative methods for solving non-singular linear systems

Aspects of Isogeometric Analysis with Catmull-Clark Subdivision Surfaces

Discrete Complex Structure on Surfel Surfaces

Reconstruction of surfaces with ordinary singularities from their silhouettes

Related Research

Reconstruction of rational ruled surfaces from their silhouettes

On the computability of the Fréchet distance of surfaces in the bit-model of real computation

Optimal Bounds for Johnson-Lindenstrauss Transformations

Computing the intersection of two quadrics through projection and lifting

A generalized projection iterative methods for solving non-singular linear systems

Aspects of Isogeometric Analysis with Catmull-Clark Subdivision Surfaces

Discrete Complex Structure on Surfel Surfaces