Suboptimality of Gauss–Hermite Quadrature and Optimality of the Trapezoidal Rule for Functions with Finite Smoothness

Randomized quadratures for integrating functions in Sobolev spaces of order α ≥ 1 \alpha \ge 1 , where the integrability condition is with respect to the Gaussian measure, are considered. In this function space, the optimal rate for the worst-case root-mean-squared error (RMSE) is established. Here, optimality is for a general class of quadratures, in which adaptive non-linear algorithms with a possibly varying number of function evaluations are also allowed. The optimal rate is given by showing matching bounds. First, a lower bound on the worst-case RMSE of O ( n − α − 1 / 2 ) O(n^{-\alpha -1/2}) is proven, where n n denotes an upper bound on the expected number of function evaluations. It turns out that a suitably randomized trapezoidal rule attains this rate, up to a logarithmic factor. A practical error estimator for this trapezoidal rule is also presented. Numerical results support our theory.

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An abstract approach to Marcinkiewicz-Zygmund inequalities for approximation and quadrature in modulation spaces

Ehler,

Gröchenig

2023

Math. Comp.

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We study the approximation and quadrature error of points that satisfy Marcinkiewicz-Zygmund inequalities. First, we investigate the use of Marcinkiewicz-Zygmund inequalities in an abstract Hilbert space for an abstract approximation and quadrature rule. The setting is then specified to Sobolev spaces induced by Freud weights e − 2 σ | x | α e^{-2\sigma |x|^\alpha } with α > 1 \alpha >1 and σ > 0 \sigma >0 , and we derive specific bounds for the approximation and quadrature error. For the Gaussian weight e − 2 π x 2 e^{-2\pi x^2} , we verify that the Sobolev spaces essentially coincide with a specific class of modulation spaces that are well known in (time-frequency) analysis.

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Suboptimality of Gauss–Hermite Quadrature and Optimality of the Trapezoidal Rule for Functions with Finite Smoothness

Cited by 4 publications

References 48 publications

Infinite-dimensional integration and L2-approximation on Hermite spaces

Infinite-dimensional integration and L2-approximation on Hermite spaces

Randomizing the trapezoidal rule gives the optimal RMSE rate in Gaussian Sobolev spaces

An abstract approach to Marcinkiewicz-Zygmund inequalities for approximation and quadrature in modulation spaces

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