On the optimal order of integration in Hermite spaces with finite smoothness

Abstract

We study the numerical approximation of integrals over Rs with respect to the standard Gaussian measure for integrands which lie in certain Hermite spaces of functions. The decay rate of the associated sequence is specified by a single integer parameter which determines the smoothness classes and the inner product can be expressed via L2 norms of the derivatives of the function. We map higher order digital nets from the unit cube to a suitable subcube of Rs via a linear transformation and show that such rules achieve, apart from powers of N, the optimal rate of convergence of the integration error.