We consider interpolation by spherical harmonics at points on a (d-1)-dimensional sphere and show that, in the limit, as the points coalesce under an angular scaling, the Lebesgue function of the process converges to that of an associated algebraic interpolation problem for the original angles considered as points in R^{d-1}.
Limiting Values Under Scaling of Lebesgue Function for Polynomial Interpolation on Spheres
DE MARCHI, STEFANO
1999
Abstract
We consider interpolation by spherical harmonics at points on a (d-1)-dimensional sphere and show that, in the limit, as the points coalesce under an angular scaling, the Lebesgue function of the process converges to that of an associated algebraic interpolation problem for the original angles considered as points in R^{d-1}.File in questo prodotto:
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