Schumaker, L. L. (1991). Recent progress on multivariate splines. In Mathematics of Finite Elements and Application VII (J. Whiteman, ed.) 535--562. Academic Press, London. Home/Search Document Not in Database Summary Related Articles Check |
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Dimension and Local Bases of Homogeneous Spline Spaces - Peter Alfeld, Marian.. (5 citations) Self-citation (Schumaker) (Correct)
....of the domain points in the planar case. Our choice here is a useful way to label control coefficients. Remark 9.4. For polynomial spline spaces on planar triangulations, there are well known lower and upper bounds on the dimension of S r d ( Delta) which are of interest for d 3r 2, see e.g. [17] and references therein. Similar bounds can be derived for our homogenous spline spaces, and will be treated elsewhere. 21 Remark 9.5. The formula (8.4) given in Theorem 8.1 for a partial trihedral decomposition is much simpler than the corresponding formula in Theorem 2.4 of [15] Since our ....
Schumaker, L. L., Recent progress on multivariate splines, in Mathematics of Finite Elements and Applications VII (J. Whiteman, ed), Academic Press (London), 1991, 535--562.
Projection Estimation In Multiple Regression With Application To.. - Huang (1996) (5 citations) (Correct)
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Schumaker, L. L. (1991). Recent progress on multivariate splines. In Mathematics of Finite Elements and Application VII (J. Whiteman, ed.) 535--562. Academic Press, London.
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