1. Ahn, Y. J., Hoffmann, C. and Rosen, P., Geometric constraints on quadratic Bézier curves using minimal length and energy, Journal of Computational and Applied Mathematics, Vol.255 (2014), pp.887–897.
2. Bashir, U., Abbas, M. and Ali, J. M., The G2 and C2 rational quadratic trigonometric Bézier curve with two shape parameters with applications, Applied Mathematics and Computation, Vol.219 (2013a), pp.10183-10197.
3. Bashir, U., Abbas, M., Awang, M. N. H. And Ali, J. M., A class of quasi-quintic trigonometric Bézier curve with two shape parameters, ScienceAsia, Vol.39S (2013b), pp.11-15.
4. Bibi, S., Abbas M., Miura, K. T. and Misro, M. Y., Geometric modeling of novel generalized hybrid trigonometric Bézier-like curve with shape parameters and its applications, Mathematics, Vol.8 (2020), doi:10.3390/math 8060967.
5. Eriskin, H. and Yücesan, A., Bézier curve with a minimal Jerk energy, Mathematical Sciences and Applications E-Notes, Vol.4, No.2 (2016), pp.139-148.