. Maxime-lhuillier and . Fig, 5 Notations for the reductio ad absurdum of Lemma 8 (tetrahedra ? 0 and ? are represented by triangles) This figure suggests that y ? |K|

J. D. Boissonnat, Geometric structures for three-dimensional shape representation, ACM Transactions on Graphics, vol.3, issue.4, pp.266-286, 1984.
DOI : 10.1145/357346.357349
URL : http://www.cs.uu.nl/docs/vakken/ddm/slides/papers/boissonnat.pdf

R. Diestel, Graph theory, 2010.

A. Gezahegne, Surface reconstruction with constrained sculpting, 2005.

P. Giblin, Graphs, surfaces and homology, 2010.
DOI : 10.1017/CBO9780511779534

J. Goodman and J. O. Rourke, Handbook of discrete and computational geometry, 2004.

M. Lhuillier and S. Yu, Manifold surface reconstruction of an environment from sparse Structure-from-Motion data, Computer Vision and Image Understanding, vol.117, issue.11, pp.1628-1644, 2013.
DOI : 10.1016/j.cviu.2013.08.002

V. Litvinov and M. Lhuillier, Incremental Solid Modeling from Sparse and Omnidirectional Structure-from-Motion Data, Procedings of the British Machine Vision Conference 2013, 2013.
DOI : 10.5244/C.27.61
URL : https://hal.archives-ouvertes.fr/hal-01635442

K. Sakai, Simplicial Homology, a Short Course, 2010.

G. Vegter, Computational Topology (eds) Handbook of discrete and computational geometry, 2004.

S. Yu and M. Lhuillier, Incremental Reconstruction of Manifold Surface from Sparse Visual Mapping, 2012 Second International Conference on 3D Imaging, Modeling, Processing, Visualization & Transmission, 2012.
DOI : 10.1109/3DIMPVT.2012.11
URL : https://hal.archives-ouvertes.fr/hal-01635459

A. J. Zomorodian, Topology for computing, 2005.
DOI : 10.1017/CBO9780511546945