kw.\*:("Subdivision scheme")
Results 1 to 25 of 39
Selection :
A non-stationary subdivision scheme for generalizing trigonometric spline surfaces to arbitrary meshesJENA, M. K; SHUNMUGARAJ, P; DAS, P. C et al.Computer aided geometric design. 2003, Vol 20, Num 2, pp 61-77, issn 0167-8396, 17 p.Article
Convergence of irregular Hermite subdivision schemesYAO ZHAO; CHEN, Di-Rong.Computer aided geometric design. 2010, Vol 27, Num 5, pp 372-381, issn 0167-8396, 10 p.Article
Honeycomb and k-fold Hermite subdivision schemesXUE, Yonggang; YU, Thomas P.-Y.Journal of computational and applied mathematics. 2005, Vol 177, Num 2, pp 401-425, issn 0377-0427, 25 p.Article
Affine combination of B-spline subdivision masks and its non-stationary counterpartsCONTI, Costanza; ROMANI, Lucia.BIT (Nordisk Tidskrift for Informationsbehandling). 2010, Vol 50, Num 2, pp 269-299, issn 0006-3835, 31 p.Article
SMOOTHNESS ANALYSIS OF SUBDIVISION SCHEMES ON REGULAR GRIDS BY PROXIMITYGROHS, Philipp.SIAM journal on numerical analysis. 2009, Vol 46, Num 4, pp 2169-2182, issn 0036-1429, 14 p.Article
A C6 approximating subdivision schemeSIDDIQI, Shahid S; AHMAD, Nadeem.Applied mathematics letters. 2008, Vol 21, Num 7, pp 722-728, issn 0893-9659, 7 p.Article
A study on the mask of interpolatory symmetric subdivision schemesKWAN PYO KO; LEE, Byung-Gook; GANG JOON YOON et al.Applied mathematics and computation. 2007, Vol 187, Num 2, pp 609-621, issn 0096-3003, 13 p.Article
Shape controlled interpolatory ternary subdivisionBECCARI, C; CASCIOLA, G; ROMANI, L et al.Applied mathematics and computation. 2009, Vol 215, Num 3, pp 916-927, issn 0096-3003, 12 p.Article
The mask of (2b + 4)-point n-ary subdivision schemeMUSTAFA, Ghulam; NAJMA ABDUL REHMAN.Computing (Wien. Print). 2010, Vol 90, Num 1-2, pp 1-14, issn 0010-485X, 14 p.Article
Towards fast and smooth subdivision surface reconstructionKARAM, H. Hussein; GHALEB, F. F. M; EL-LATIF, Y. M. Abd et al.International journal of computers & applications. 2006, Vol 28, Num 2, pp 170-176, issn 1206-212X, 7 p.Article
Error bounds for a convexity-preserving interpolation and its limit functionAMATA, S; DADOURIAN, K; DONAT, R et al.Journal of computational and applied mathematics. 2008, Vol 211, Num 1, pp 36-44, issn 0377-0427, 9 p.Article
Scalar multivariate subdivision schemes and box splinesCHARINA, Maria; CONTI, Costanza; JETTER, Kurt et al.Computer aided geometric design. 2011, Vol 28, Num 5, pp 285-306, issn 0167-8396, 22 p.Article
Smoothness equivalence properties of interpolatory Lie group subdivision schemesGANG XIE; YU, Thomas P.-Y.IMA journal of numerical analysis. 2010, Vol 30, Num 3, pp 731-750, issn 0272-4979, 20 p.Article
C2 subdivision over triangulations with one extraordinary pointZULTI, Avi; LEVIN, Adi; LEVIN, David et al.Computer aided geometric design. 2006, Vol 23, Num 2, pp 157-178, issn 0167-8396, 22 p.Article
Jet subdivision schemes on the k-regular complexYONGGANG XUE; YU, Thomas P.-Y; DUCHAMP, Tom et al.Computer aided geometric design. 2006, Vol 23, Num 4, pp 361-396, issn 0167-8396, 36 p.Article
SMOOTHNESS EQUIVALENCE PROPERTIES OF MANIFOLD-VALUED DATA SUBDIVISION SCHEMES BASED ON THE PROJECTION APPROACHGANG XIE; YU, Thomas P.-Y.SIAM journal on numerical analysis. 2008, Vol 45, Num 3, pp 1200-1225, issn 0036-1429, 26 p.Article
Convexity preservation of the interpolating four-point C2 ternary stationary subdivision schemeZHIJIE CAI.Computer aided geometric design. 2009, Vol 26, Num 5, pp 560-565, issn 0167-8396, 6 p.Article
Regularity of irregular subdivisionDAUBECHIES, I; GUSKOV, I; SWELDENS, W et al.Constructive approximation. 1999, Vol 15, Num 3, pp 381-426, issn 0176-4276Article
Stationary subdivision schemes reproducing polynomialsSUNG WOO CHOI; LEE, Byung-Gook; YEON JU LEE et al.Computer aided geometric design. 2006, Vol 23, Num 4, pp 351-360, issn 0167-8396, 10 p.Article
Number systems, α-splines and refinementZUBE, Severinas.Journal of computational and applied mathematics. 2004, Vol 172, Num 2, pp 207-231, issn 0377-0427, 25 p.Article
Convergence rates of cascade algorithmsJIA, Rong-Qing.Proceedings of the American Mathematical Society. 2003, Vol 131, Num 6, pp 1739-1749, issn 0002-9939, 11 p.Article
Stationary subdivisionCAVARETTA, A. S; DAHMEN, W; MICCHELLI, C. A et al.Memoirs of the American Mathematical Society. 1991, Vol 93, Num 453, issn 0065-9266, p. 186Serial Issue
Modified form of binary and ternary 3-point subdivision schemesSIDDIQI, Shahid S; REHAN, Kashif.Applied mathematics and computation. 2010, Vol 216, Num 3, pp 970-982, issn 0096-3003, 13 p.Article
How data dependent is a nonlinear subdivision scheme? a case study based on convexity preserving subdivisionYU, Thomas Pok-Yin.SIAM journal on numerical analysis. 2007, Vol 44, Num 3, pp 936-948, issn 0036-1429, 13 p.Article
Incenter subdivision scheme for curve interpolationCHONGYANG DENG; GUOZHAO WANG.Computer aided geometric design. 2010, Vol 27, Num 1, pp 48-59, issn 0167-8396, 12 p.Article
