Hyperinterpolation variants on the sphere achieve stable Sobolev approximation from scattered data by interpreting discretization error as the action of a spectral multiplier on the cubature discrepancy measure, without requiring exact cubature formulas.
Mont\'ufar and Y
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Hyperinterpolation beyond exact cubature: a spectral multiplier approach
Hyperinterpolation variants on the sphere achieve stable Sobolev approximation from scattered data by interpreting discretization error as the action of a spectral multiplier on the cubature discrepancy measure, without requiring exact cubature formulas.