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Examples of linear multi-box splines

Published online by Cambridge University Press:  01 December 2012

Abdellatif Bettayeb*
Affiliation:
General Studies Department, Jubail Industrial College, PO Box 10099 Jubail industrial city 31961, Saudi Arabia (email: [email protected], [email protected])

Abstract

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Let S1=S1(v0,…,vr+1) be the space of compactly supported C0 piecewise linear functions on a mesh M of lines through ℤ2 in directions v0,…,vr+1, possibly satisfying some restrictions on the jumps of the first order derivative. A sequence ϕ=(ϕ1,…,ϕr) of elements of S1 is called a multi-box spline if every element of S1 is a finite linear combination of shifts of (the components of) ϕ. We give some examples for multi-box splines and show that they are stable. It is further shown that any multi-box spline is not always symmetric

Type
Research Article
Copyright
© The Author(s) 2012

References

[1]Dahlen, M., Lyche, K., Mørken, K., Schneider, R. and Seidel, H.-P., ‘Multiresolution analysis over triangles, based on quadratic Hermite interpolation’, J. Computat. Appl. Math. 119 (2000) 97114.CrossRefGoogle Scholar
[2]Goodman, T. N. T., ‘Pairs of refinable bivariate splines’, Advanced topics in multivariate approximation (eds Fontanella, F., Jetter, K. and Laurent, P.-J.; World Scientific, 1996) 125138.Google Scholar
[3]Goodman, T. N. T., ‘Constructing pairs of refinable bivariate spline functions’, Surface fitting and multiresolution methods (eds Le Méhauté, A., Rabut, C. and Schumaker, L. L.; Vanderbilt University Press, Nashville, 1997) 151158.Google Scholar
[4]Goodman, T. N. T. and Hardin, D., ‘Refinable multivariate spline functions’, Topics in Multivariate Approximation and Interpolation (eds Jetter, K.et al.; Elsevier, 2005) 5583.Google Scholar
[5]Goodman, T. N. T., ‘Multi-box splines’, Constr. Approx. 25 (2007) 279301.CrossRefGoogle Scholar