Okazaki, Y.; Takahashi, Y. - In: Statistics & Probability Letters 5 (1987) 6, pp. 397-399
Let [mu] be a cylindrical measure on a locally convex Hausdorff space E, [mu] be the topology of convergence in probability on the null space of and . is called the kernel of [mu]. We prove that if and only if has the separating dual, where is the polar of in E'. This is an answer to a problem...