B. , P. And-knauer, and C. , Testing congruence and symmetry for general 3-dimensional objects, Comput. Geom. Theory Appl, vol.27, issue.1, pp.3-11, 2004.

H. , E. W. Uk, J. Ivanic, and K. And-ruedenberg, The Theory of Spherical and Ellipsoidal Harmonics Rotation matrices for real spherical harmonics, direct determination by recursion, See also Additions and corrections, pp.6342-6347, 1931.

J. , X. Bunke, and H. , Determination of the symmetries of polyhedra and an application to object recognition, Proceedings of the International Workshop on Computational Geometry?Methods, Algorithms and Applications (CG '91), 1991.

K. , M. M. Funkhouser, T. A. And-rusinkiewicz, and S. , Rotation invariant spherical harmonic representation of 3D shape descriptors, Proceedings of the 2003 Eurographics/ACM Siggraph Symposium on Geometry Processing (SGP '03). Eurographics Association, pp.167-175, 2003.

K. , M. M. Funkhouser, T. A. And-rusinkiewicz, and S. , Symmetry descriptors and 3D shape matching Eurographics Association, Proceedings of the 2004 Eurographics/ACM Siggraph Symposium on Geometry Processing, 2004.

K. , D. E. Morris, J. , J. H. And-pratt, and V. R. , Fast pattern matching in strings, SIAM J. Comput, vol.6, issue.2, pp.323-350, 1977.

M. , P. Ishikawa, S. And-kato, and K. , Symmetry identification of a 3-D object represented by octree, IEEE Trans. Patt. Analy. Mach. Intell, vol.15, issue.5, pp.507-514, 1993.

R. , R. And, P. Hanrahan, C. Sun, . And et al., A signal-processing framework for reflection, 3D symmetry detection using extended Gaussian image, pp.1004-1042, 1997.

W. , J. D. Woo, T. C. And, and R. A. Volz, Optimal algorithms for symmetry detection in two and three dimensions, Visual Comput, vol.1, pp.37-48, 1985.

Z. , H. Peleg, S. And-avnir, and D. , Symmetry as a continuous feature, IEEE Trans. Patt. Analy. Mach. Intell, vol.17, issue.12, pp.1154-1166, 1995.