Graphics Reference
In-Depth Information
BIBLIOGRAPHY
[127]
Z. Lian, A. Godil, B. Bustos, M. Daoudi, J. Hermans, S. Kawamura, Y. Kurita, G. Lavoué,
H. Van Nguyen, R. Ohbuchi, Y. Ohkita, Y. Ohishi, F. Porikli, M. Reuter, I. Sipiran,
D. Smeets, P. Suetens, H. Tabia, and D. Vandermeulen. A comparison of methods for
non-rigid 3D shape retrieval.
Pattern Recognition
, 46(1):449-461, January 2013.
DOI:
10.1016/j.patcog.2012.07.014
.
90
[128]
Y. Lipman and T. Funkhouser. Möbius voting for surface correspondence.
ACM Trans.
Graph.
, 28(3):72:1-72:12, July 2009.
DOI: 10.1145/1531326.1531378
.
xiii
,
46
,
47
,
48
[129]
Y.-J. Liu, Y.-F. Zheng, L. Lv, Y.-M. Xuan, and X.-L. Fu. 3D model retrieval
based on color + geometry signatures.
e Visual Computer
, 28(1):75-86, 2012.
DOI:
10.1007/s00371-011-0605-8
.
89
[130]
H. Maehara. Why is
P
2
Not Embeddable in
R
3
?
e American Mathematical Monthly
,
100(9):pp. 862-864, 1993.
DOI: 10.2307/2324664
.
56
[131]
P. Magillo, E. Danovaro, L. De Floriani, L. Papaleo, and M. Vitali. Extracting terrain
morphology: A new algorithm and a comparative evaluation. In
Proceedings of the
2
nd
International Conference on Computer Graphics eory and Applications
, March 8-11 '2007.
77
[132]
T. Maldonado.
Reale e Virtuale
. Feltrinelli, 1994.
2
[133]
A. Mangan and R. Whitaker. Partitioning 3D surface meshes using watershed segmen-
tation.
IEEE Transaction on Visualization and Computer Graphics
, 5(4):308-321, 1999.
DOI: 10.1109/2945.817348
.
77
[134]
M. Mantyla.
Introduction to Solid Modeling
. WH Freeman & Co. New York, NY, USA,
1988.
7
,
53
[135]
W. Massey.
Algebraic Topology: An Introduction
. Brace & World, Inc, 1967.
53
[136]
J. C. Maxwell. On Hills and Dales.
e London, Edinburgh and Dublin Philosophical
,
40(269):421-425, 1870.
75
[137]
D. S. Meek and D. J. Walton. On surface normal and gaussian curvature approximations
given data sampled from a smooth surface.
Comput. Aided Geom. Des.
, 17(6):521-543, July
2000.
DOI: 10.1016/S0167-8396(00)00006-6
.
31
[138]
F. Mémoli. Gromov-Wasserstein distances and the metric approach to object matching.
Foundations of Computational Mathematics
, 11(4):417-487, 2011.
DOI: 10.1007/s10208-
011-9093-5
.
50
[139]
F. Mémoli. Some properties of Gromov-Hausdorff distances.
Discrete & Computational
Geometry
, pages 1-25, 2012.
DOI: 10.1007/s00454-012-9406-8
.
50
Search WWH ::
Custom Search