A class of multivariate infinitely divisible distributions related to arcsine density

Abstract

Two transformations A1 and A2 of L\'evy measures on Rd based on the arcsine density are studied and their relation to general Upsilon transformations is considered. The domains of definition of A1 and A2 are determined and it is shown that they have the same range. The class of infinitely divisible distributions on Rd with L\'evy measures being in the common range is called the class A and any distribution in the class A is expressed as the law of a stochastic integral ∫01(2-1 t)\,dXt with respect to a L\'evy process \Xt\. This new class includes as a proper subclass the Jurek class of distributions. It is shown that generalized type G distributions are the image of distributions in the class A under a mapping defined by an appropriate stochastic integral. A2 is identified as an Upsilon transformation, while A1 is shown not to be.