úÎΛ     (C) 2012-2015 Edward Kmett BSD-style (see the file LICENSE)Edward Kmett <ekmett@gmail.com> provisionalportableNoneF @Integral with an result and an estimate of the error such that 0(result - errorEstimate, result + errorEstimate) probably bounds the actual answer.)Convert a Result to a confidence interval?Filter a list of results using a specified absolute error bound?Filter a list of results using a specified relative error boundIIntegrate a function from 0 to infinity by using the change of variables  x = t/(1-t) This works muchG better than just clipping the interval at some arbitrary large number. ZIntegrate from -inf to inf using tanh-sinh quadrature after using the change of variables  x = tan t !everywhere trap (\x -> exp(-x*x)) This works muchM better than just clipping the interval at arbitrary large and small numbers. jIntegration using a truncated trapezoid rule and tanh-sinh quadrature with a specified evaluation strategy GIntegration using a truncated trapezoid rule under tanh-sinh quadrature iIntegration using a truncated trapezoid rule under tanh-sinh quadrature with buffered parallel evaluation lIntegration using a truncated Simpson's rule under tanh-sinh quadrature with a specified evaluation strategyGIntegration using a truncated Simpson's rule under tanh-sinh quadratureiIntegration using a truncated Simpson's rule under tanh-sinh quadrature with buffered parallel evaluation           integration-0.2.1Numeric.Integration.TanhSinhResultresult errorEstimate evaluations confidenceabsoluterelative nonNegative everywheretrap'trapparTrapsimpson'simpson parSimpsonDDm_hugew0dd0dd1dd