Convolution comparison measures

Abstract

We give a precise functional comparison between classical and free convolutions. If μ and are compactly supported probability measures, we show that the expectation of f over the classical convolution μ * is at least the expectation of f over the free convolution μ , as long as the fourth derivative of f is non-negative. Conversely, the non-negativity of the fourth derivative is necessary for such a comparison. This comparison is based on the positivity of a related measure on R2, which we dub the convolution comparison measure. We give an expression for this measure using a curious identity involving Hermitian matrices.