Approximating Mills ratio
Abstract
Consider the Mills ratio f(x)=(1-(x))/φ(x), \, x 0, where φ is the density function of the standard Gaussian law and its cumulative distribution.We introduce a general procedure to approximate f on the whole [0,∞) which allows to prove interesting properties where f is involved. As applications we present a new proof that 1/f is strictly convex, and we give new sharp bounds of f involving rational functions, functions with square roots or exponential terms. Also Chernoff type bounds for the Gaussian Q--function are studied.
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