Most numbers are not normal

Abstract: We show, from a topological viewpoint, that most numbers are not normal in a strong sense. More precisely, the set of numbers $x \in (0,1]$ with the following property is comeager: for all integers $b\ge 2$ and $k\ge 1$ , the sequence of vectors made by the frequencies of all possibile strings of length k in the b-adic representation of x has a maximal subset of accumulation points, and each of them is the limit of a subse… Show more

“…Results in the same spirit, but completely different contexts, appeared, e.g., in [2,3,14,15]. In Section 2 we collect some preliminary results, while in Section 3 we provide the proofs of Theorem 1.2 and Corollary 1.3.…”

The maximum domain of attraction of multivariate extreme value distributions is small

“…Results in the same spirit, but completely different contexts, appeared, e.g., in [2,3,14,15]. In Section 2 we collect some preliminary results, while in Section 3 we provide the proofs of Theorem 1.2 and Corollary 1.3.…”

The maximum domain of attraction of multivariate extreme value distributions is small

Strictly frequentist imprecise probability

Almost all sets of nonnegative integers and their small perturbations are not sumsets