A Lower Bound on the Relative Entropy with Respect to a Symmetric Probability
Abstract
Let and μ be two probability measures on R which are not the Dirac mass at 0. We denote by H(μ|) the relative entropy of μ with respect to . We prove that, if is symmetric and μ has a finite first moment, then \[ H(μ|)≥ (∫Rz\,dμ(z))22∫Rz2\,dμ(z)\,,\] with equality if and only if μ=.
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