Abstract
A simple technique for conditioning highly oscillatory integrands to make them suitable for Monte Carlo evaluation is presented and investigated numerically for one-dimensional problems. The technique involves averaging the integrand uniformly over a local region if the integrand is oscillating rapidly. In regions of slow oscillation the unconditioned integrand is employed. The averaging region is chosen to be one oscillation. We argue that the proper choice of the averaging region is important in determining the suitability of the conditioned integrand for use in Monte Carlo calculations.
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