
A novel linear integration rule called control neighbors is proposed that achieves the optimal O(n^(-1/2)n^(-s/d)) convergence rate for integrating Hölder functions of regularity s over metric spaces with intrinsic dimension d, where n is the number of function evaluations.


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optimal-convergence-rates-for-monte-carlo-integration-via-control-neighbors


Optimal Convergence Rates for Monte Carlo Integration via Control Neighbors
