On multivariate quasi-infinitely divisible distributions
Abstract
A quasi-infinitely divisible distribution on Rd is a probability distribution μ on Rd whose characteristic function can be written as the quotient of the characteristic functions of two infinitely divisible distributions on Rd. Equivalently, it can be characterised as a probability distribution whose characteristic function has a L\'evy--Khintchine type representation with a "signed L\'evy measure", a so called quasi--L\'evy measure, rather than a L\'evy measure. A systematic study of such distributions in the univariate case has been carried out in Lindner, Pan and Sato lindner. The goal of the present paper is to collect some known results on multivariate quasi-infinitely divisible distributions and to extend some of the univariate results to the multivariate setting. In particular, conditions for weak convergence, moment and support properties are considered. A special emphasis is put on examples of such distributions and in particular on Zd-valued quasi-infinitely divisible distributions.
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