On the Skitovich-Darmois theorem for a-adic solenoids

Abstract

Let X be a compact connected Abelian group. It is well-known that then there exist topological automorphisms αj, βj of X and independent random variables 1 and 2 with values in X and distributions μ1, μ2 such that the linear forms L1 = α11 + α22 and L2 = β11 + β22 are independent, whereas μ1 and μ2 are not represented as convolutions of Gaussian and idempotent distributions. This means that the Skitovich--Darmois theorem fails for such groups. We prove that if we consider three linear forms of three independent random variables taking values in X, where X is an a-adic solenoid, then the independence of the linear forms implies that at least one of the distributions is idempotent. We describe all such solenoids.