Strong tractability for multivariate integration in a subspace of the Wiener algebra

Abstract

Building upon recent work by the author, we prove that multivariate integration in the following subspace of the Wiener algebra over [0,1)d is strongly polynomially tractable: \[ Fd:=\ f∈ C([0,1)d)\:| \: \|f\|:=Σk∈ Zd|f(k)|(width(supp(k)),j∈ supp(k) |kj|)<∞ \,\] with f(k) being the k-th Fourier coefficient of f, supp(k):=\j∈ \1,…,d\ kj≠ 0\, and width: 2\1,…,d\ \1,…,d\ being defined by \[ width(u):=j∈ uj-j∈ uj+1,\] for non-empty subset u⊂eq \1,…,d\ and width():=1. Strong polynomial tractability is achieved by an explicit quasi-Monte Carlo rule using a multiset union of Korobov's p-sets. We also show that, if we replace width(supp(k)) with 1 for all k∈ Zd in the above definition of norm, multivariate integration is polynomially tractable but not strongly polynomially tractable.