Integrability of weak mixed first-order derivatives and convergence rates of scrambled digital nets
Abstract
We consider the Lp integrability of weak mixed first-order derivatives of the integrand and study convergence rates of scrambled digital nets. We show that the generalized Vitali variation with parameter α ∈ [12, 1] from [Dick and Pillichshammer, 2010] is bounded above by the Lp norm of the weak mixed first-order derivative, where p = 23-2α. Consequently, when the weak mixed first-order derivative belongs to Lp for 1 ≤ p ≤ 2, the variance of the scrambled digital nets estimator convergences at a rate of O(N-4+2p s-1 N). Numerical experiments further validate the theoretical results.
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