Weak stability and generalized weak convolution for random vectors and stochastic processes
Abstract
A random vector X is weakly stable iff for all a,b∈ R there exists a random variable such that a X+b X'd= X. This is equivalent (see MOU) with the condition that for all random variables Q1,Q2 there exists a random variable such that X Q1 + X' Q2 d= X , where X, X',Q1,Q2, are independent. In this paper we define generalized convolution of measures defined by the formula L(Q1) μ L(Q2) = L(), if the equation (*) holds for X,Q1,Q2, and μ = L(). We study here basic properties of this convolution, basic properties of μ-infinitely divisible distributions, μ-stable distributions and give a series of examples.
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