On multidimensional Mandelbrot's cascades

Abstract

Let Z be a random variable with values in a proper closed convex cone C⊂ Rd, A a random endomorphism of C and N a random integer. We assume that Z, A, N are independent. Given N independent copies (Ai,Zi) of (A,Z) we define a new random variable Z = Σi=1N Ai Zi. Let T be the corresponding transformation on the set of probability measures on C i.e. T maps the law of Z to the law of Z. If the matrix E[N] E [A] has dominant eigenvalue 1, we study existence and properties of fixed points of T having finite nonzero expectation. Existing one dimensional results concerning T are extended to higher dimensions. In particular we give conditions under which such fixed points of T have multidimensional regular variation in the sense of extreme value theory and we determine the index of regular variation.