Sharp convergence bounds for sums of POD and SPOD weights

Abstract

This work analyzes the convergence of sums of the form Sγ(m)=Σv⊂eq Nγv m|v| with product and order dependent (POD) weights γv. We establish that for a nonnegative sequence \Υj j∈ N\, Σv⊂eq N |v|! m|v|Πj∈ v Υj<∞ for all m>0 if and only if Σj=1∞ Υj<∞. We further characterize the growth of Sγ(m) when γv=(|v|!)σΠj∈ vj-ρ and prove that Sγ(m) is of asymptotic order m1/(ρ-σ) when ρ>σ≥ 0. We subsequently generalize both the convergence criterion and the asymptotic order of Sγ(m) to smoothness-driven product and order dependent (SPOD) weights, while noting that a full necessary-and-sufficient analogue remains open. Finally, we apply our theory to quasi-Monte Carlo (QMC) integration, showing that interlaced polynomial lattice rules achieve a dimension-independent convergence rate without a commonly imposed assumption in the QMC literature.

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