Paul Catala, Mathias Hockmann, Stefan Kunis, Markus Wageringel
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引用次数: 0
摘要
在许多应用中,有限总变的复值度量是一种强大的信号模型。限于 d 维环面,如果三角矩的阶数足够大,那么有限支持的度量可以精确地从它们的三角矩恢复到某个阶数。在此,我们考虑用关于 1-Wasserstein 距离的固定阶三角多项式来近似一般度量,例如曲线上支持的度量。当已知度量的三角矩时,我们证明了其最佳近似值的尖锐下界和有效可计算近似值的(几乎)匹配上界。我们还证明了第二类平方和多项式可以在度量的支持面上对指标函数进行插值,并在外部收敛为零。
Approximation and Interpolation of Singular Measures by Trigonometric Polynomials
Complex valued measures of finite total variation are a powerful signal model in many applications. Restricting to the d-dimensional torus, finitely supported measures can be exactly recovered from their trigonometric moments up to some order if this order is large enough. Here, we consider the approximation of general measures, e.g., supported on a curve, by trigonometric polynomials of fixed degree with respect to the 1-Wasserstein distance. We prove sharp lower bounds for their best approximation and (almost) matching upper bounds for effectively computable approximations when the trigonometric moments of the measure are known. A second class of sum of squares polynomials is shown to interpolate the indicator function on the support of the measure and to converge to zero outside.