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• Zhang, C. , Du, S., Liu, J.,Li, Y., Xue,J., Liu, Y., Robust iterative closest point algorithm with bounded rotation angle for 2D registration, Neurocomputing, 195(2016),172-180.
• Besl, P. J., McKay, N. D., A method for registration of 3-D shapes, IEEE Transactions on Pattern Analysis and Machine Intelligence, 14(2) (1992), 239-256.
• Du, S., Zheng, N., Ying, S., Liu, J., Affine iterative closest point algorithm for point set registration, Pattern Recognition Letters, 31(2010),791-799.
• Chen, H., Zhang, X., Du, S., Wu, Z., Zheng, N., A Correntropy-based affine iterative closest point algorithm for robust point set registration, IEEE/CAA J. Autom. Sin., 6 (4) (2019), 981-991.
• Weiss, I., Geometric invariants and object recognition, J. Math. Imaging Vision, 10 (3) (1993), 201-231 .
• Sanchez-Reyes, J., Complex rational Bézier curves, Comput. Aided Geom. Design, 26(8) (2009), 865-876.
• Tsianos, K. I., Goldman, R., Bézier and B-spline curves with knots in the complex plane, Fractals, 19(1) (2011), 67-86.
• Ait-Haddou, R., Herzog, W., Nomura, T., Complex Bézier curves and the geometry of polygons, Comput. Aided Geom. Design, 27(7) (2010), 525-537.
• Ören, İ., On the control invariants of planar Bézier curves for the groups M(2) and SM(2), Turk. J. Math. Comput. Sci.,10 (2018), 74-81.
• Khadjiev, D., Ören, İ., Pekşen,Ö., Global invariants of paths and curves for the group of all linear similarities in the two-dimensional Euclidean space, Int. J. Geom. Methods Mod. Phys., 15(6)(2018), 1-28.
• Alcazar, J. G., Hermoso, C., Muntingh, G., Detecting similarity of rational plane curves, J. Comput. Appl. Math., 269 (2014), 1-13.
• Alcazar, J. G., Hermoso, C,, Muntingh, G., Similarity detection of rational space curves, J. Symbolic Comput., 85 (2018), 4-24.
• Alcazar, J. G., Gema, M. Diaz-Toca, Hermoso, C., On the problem of detecting when two implicit plane algebraic curves are similar, Internat. J. Algebra Comput, 29 (5) (2019),775-793.
• Hauer, M., Jüttler, B., Detecting affine equivalences of planar rational curves, EuroCG 2016, Lugano, Switzerland, March 30-April 1, 2016.
• Ören, İ., Equivalence conditions of two Bézier curves in the Euclidean geometry, Iran J Sci Technol Trans Sci, 42(3) (2016),1563-1577.
• Reyes, J. S., Detecting symmetries in polynomial Bézier curves,J. Comput. Appl. Math., 288 (2015), 274-283.
• Mozo-Fernandez, J., Munuera, C., Recognition of polynomial plane curves under affine transformations, AAECC, 13 (2002), 121-136.
• Gürsoy, O., İncesu, ., LS(2)-Equivalence conditions of control points and application to planar Bézier curves, New Trends in Mathematical Science, 3 (2017), 70-84.
• Bez, H.E., Generalized invariant-geometry conditions for the rational Bézier paths, Int J Comput Math, 87 (2010), 793-811 .
• Encheva, R. P., Georgiev, G. H., Similar Frenet curves, Result. Math, 55 (2009), 359-372.
• Khadjiev, D., Ören, İ., Global invariants of paths and curves for the group of orthogonal transformations in the two-dimensional Euclidean space, An. Ştiinţ. Univ. "Ovidius" Constanţa Ser. Mat., 27(2) (2019), 37-65.
• Marsh, D., Applied Geometry For Computer Graphics and CAD, Springer-Verlag, London,1999.
• Berger, M., Geometry I, Springer-Verlag, Berlin, Heidelberg, 1987.