Affiliation:
1. Kuwait University PO Box 5969, 13060 Safat, Kuwait
Abstract
We propose a new method for constructing a polyspline on annuli, i.e. a C 2 surface on ℝ2 \ {0}, which is piecewise biharmonic on annuli centered at 0 and interpolates smooth data at all interface circles. A unique surface is obtained by imposing Beppo Levi conditions on the innermost and outermost annuli, and one additional restriction at 0: either prescribing an extra data value, or asking that the surface is non-singular. We show that the resulting Beppo Levi polysplines on annuli are in fact thin plate splines, i.e. they minimize Duchon's bending energy.
Publisher
Vilnius Gediminas Technical University
Subject
Modelling and Simulation,Analysis
Reference18 articles.
1. R.S. Al-Sahli .L-spline interpolation and biharmonic polysplines on annuli . Master's thesis , Kuwait University, Department of Mathematics , 2012 .
2. Multidimensional Minimizing Splines
3. Semi-cardinal polyspline interpolation with Beppo Levi boundary conditions
4. Transfinite Thin Plate Spline Interpolation
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