Multivariate reciprocal inverse Gaussian distributions from the Sabot -Tarr\`es -Zeng integral

Abstract

In Sabot and Tarr\`es (2015), the authors have explicitly computed the integral STZn=∫ ( - x,y)( Mx)-1/2dx where Mx is a symmetric matrix of order n with fixed non positive off-diagonal coefficients and with diagonal (2x1,…,2xn). The domain of integration is the part of Rn for which Mx is positive definite. We calculate more generally for b1≥ 0,… bn≥ 0 the integral GSTZn=∫ (- x,y-12b*Mx-1b)( Mx)-1/2dx, we show that it leads to a natural family of distributions in Rn, called the GSTZn probability laws. This family is stable by marginalization and by conditioning, and it has number of properties which are multivariate versions of familiar properties of univariate reciprocal inverse Gaussian distribution. We also show that if the graph with the set of vertices V=\1,…,n\ and the set E of edges \i,j\' s of non zero entries of Mx is a tree, then the integral ∫ ( - x,y)( Mx)q-1dx where q>0, is computable in terms of the MacDonald function Kq.