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Bibliografie

Journal Article

3D rotation invariants by complex moments

Suk Tomáš, Flusser Jan, Boldyš Jiří

: Pattern Recognition vol.48, 11 (2015), p. 3516-3526

: GA13-29225S, GA ČR, GA15-16928S, GA ČR

: Complex moment, spherical harmonic, group representation theory, 3D rotation invariant

: 10.1016/j.patcog.2015.05.007

: http://library.utia.cas.cz/separaty/2015/ZOI/suk-0445882.pdf

(eng): A generalization of the complex moments from 2D to 3D is described. Group representation theory is used to construct 3D rotation invariants from them. The algorithm for automatic generating of the invariants of higher orders is proposed.An algorithm for automatic generation of higher order invariants is proposed. The linearly dependent invariants are eliminated. The invariants are experimentally tested on 3D graphical models and also on real volumetric data.

: IN