Analysis of the Gibbs phenomenon in stationary subdivision schemes
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[1] Shahid S. Siddiqi,et al. A C6 approximating subdivision scheme , 2008, Appl. Math. Lett..
[2] D. Levin,et al. Subdivision schemes in geometric modelling , 2002, Acta Numerica.
[3] Jacques Liandrat,et al. On a nonlinear subdivision scheme avoiding Gibbs oscillations and converging towards Cs functions with s>1 , 2011, Math. Comput..
[4] Shahid S. Siddiqi,et al. A new three-point approximating C2 subdivision scheme , 2007, Appl. Math. Lett..
[5] George Merrill Chaikin,et al. An algorithm for high-speed curve generation , 1974, Comput. Graph. Image Process..
[6] Gilles Deslauriers,et al. Symmetric iterative interpolation processes , 1989 .
[7] Jieqing Tan,et al. A Five-Point Subdivision Scheme with Two Parameters and a Four-Point Shape-Preserving Scheme , 2017 .
[8] Chi-Wang Shu,et al. On the Gibbs Phenomenon and Its Resolution , 1997, SIAM Rev..
[9] Shahid S. Siddiqi,et al. Construction of m-point binary approximating subdivision schemes , 2013, Appl. Math. Lett..