摘要
Problem and results. Let be a class of pr. measures defined on a measurable space (Ω,), and X1, X2… be a sequence of random variables on Ω with range Rk, such that for any P∈these variables are independent and identically distributed. Denote by Fp the d.f. and distribution of X1 on (Rk,k). Let h be a real and finitevalued function given on Ω. Usually the elements of Ω are determined by the points θ of a metric space (different θ’s correspond to different P’s), in such a case