Abstract
We study a subspace of bivariate trigonometric polynomials for interpolating functions on the sphere. We give an explicit construction for a system of interpolation nodes, and the corresponding basis for this space, that allows a (discrete) fast Fourier transform-type formula for the interpolant. We prove that the uniform norm of our interpolation operator is of the order log M2, where M is the number of interpolation points. We also construct a minimal quadrature rule for our space (with a number of points equal to the dimension of the space), and describe an associated interpolation operator.
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