https://orcid.org/0000-0002-3669-4708
References
- D. Burkhart, B. Hamann, and G. Umlauf, Iso-geometric finite element analysis based on Catmull–Clark subdivision solids, Comput. Graphics Forum 29 (2010), pp. 1575–1584.
- E. Catmull and J. Clark, Recursively generated B-spline surfaces on arbitrary topological meshes, Comput. Aided Des. 10(6) (1978), pp. 350–355.
- G.M. Chaikin, An algorithm for high speed curve generation, Comput. Graph. Image Process. 3(4) (1974), pp. 346–349.
- M. Charina, C. Conti, N. Guglielmi, and V. Protasov, Regularity of non-stationary subdivision: A matrix approach, Numer. Math. 135 (2017), pp. 639–678.
- M. Charina, C. Conti, T. Mejstrik, and J.L. Merrien, Joint spectral radius and ternary Hermite subdivision, Adv. Comput. Math. 47 (2021), p. 25.
- C. Conti, L. Gemignani, and L. Romani, From symmetric subdivision masks of Hurwitz type to interpolatory subdivision masks, Linear Algebra Appl. 431(10) (2009), pp. 1971–1987.
- C. Conti, L. Gemignani, and L. Romani, From approximating to interpolatory non-stationary subdivision schemes with the same generation properties, Adv. Comput. Math. 35(2–4) (2011), pp. 217–241.
- C. Conti, N. Dyn, C. Manni, and M.-L. Mazure, Convergence of univariate non-stationary subdivision schemes via asymptotic similarity, Comput. Aided Geom. Des. 37 (2015), pp. 1–8.
- C. Conti, L. Gemignani, and L. Romani, Exponential splines and pseudo-splines: Generation versus reproduction of exponential polynomials, J. Math. Anal. Appl. 439 (2016), pp. 32–56.
- C. Conti, L. Romani, and J. Yoon, Sum rules versus approximate sum rules in subdivision, J. Approx. Theory 207 (2016), pp. 380–401.
- N. Dyn and D. Levin, Analysis of asymptotically equivalent binary subdivision schemes, J. Math. Anal. Appl. 193 (1995), pp. 594–621.
- M. Fang, W. Ma, and G. Wang, A generalized curve subdivision scheme of arbitrary order with a tension parameter, Comput. Aided Geom. Des. 27 (2010), pp. 720–733.
- F. Guo, H. Zheng, and G. Peng, Multiresolution representation for curves based on ternary subdivision schemes, Int. J. Comput. Math. 92(7) (2015), pp. 1353–1372.
- Y. Hu, H. Zheng, and J. Geng, Calculation of dimensions of curves generated by subdivision schemes, Int. J. Comput. Math. 96 (2019), pp. 1278–1291.
- Y. Lü, G. Wang, and X. Yang, Uniform hyperbolic polynomial B-spline curves, Comput. Aided Geom. Des. 19 (2002), pp. 379–393.
- Y. Lü, G. Wang, and X. Yang, Uniform trigonometric polynomial B-spline curves, Sci. China Ser. F 45(5) (2002), pp. 335–343.
- C. Moosmüler, S. Hüning, and C. Conti, Stirling numbers and Gregory coefficients for the factorization of Hermite subdivision operators, IMA J. Numer. Anal. 47(2020), pp. 1–26.
- S.S. Siddiqi and N. Ahmad, A proof of the smoothness of the 6-point interpolatory scheme, Int. J. Comput. Math. 83 (2006), pp. 503–509.
- S.S. Siddiqi and N. Ahmad, A new five-point approximating subdivision scheme, Int. J. Comput. Math. 85 (2008), pp. 65–72.
- S.S. Siddiqi and K. Rehan, A ternary three-point scheme for curve designing, Int. J. Comput. Math.87 (2010), pp. 1709–1715.
- S.S. Siddiqi and K. Rehan, Curve subdivision schemes for geometric modelling, Int. J. Comput. Math. 88 (2011), pp. 851–863.
- J. Stam, On subdivision schemes generalizing uniform B-spline surfaces of arbitrary degree, Comput. Aided Geom. Des. 18(5) (2001), pp. 383–396.
- V. Uhlmann, R. Delgado-Gonzalo, C. Conti, L. Romani, and M. Unser, Exponential Hermite Splines for the Analysis of Biomedical Images, Proceedings of IEEE International Conference on Acoustic, Speech and Signal Processing (ICASSP), IEEE, Firenze, Italy, 2014, pp. 1650–1653.
- G. Wang and M. Fang, Unified and extended form of three types of splines, J. Comput. Appl. Math. 216(2) (2008), pp. 498–508.
- J. Warren and H. Weimer, Subdivision Methods for Geometric Design, Morgan-Kaufmann, New York, 2002.
- H. Zhang, J.-H. Yong, and J.-C. Paul, Adaptive geometry compression based on four-point interpolatory subdivision schemes with labels, Int. J. Comput. Math. 84 (2007), pp. 1353–1365.