Topological and metric properties of sets of real numbers with conditions on their expansions in Ostrogradskii series

We study topological and metric properties of the set c[o-1, {Vn}] = {x: x = ∑n {(-1)n - 1} g 1 (g1 + g2) \ldots (g1 + g 2 + \ldots + gn)}}, gk ∈ Vk ⊂ ℕ} with certain conditions on the sequence of sets {V n }. In particular, we establish conditions under which the Lebesgue measure of this set is (a) zero and (b) positive. We compare the results obtained with the corresponding results for continued fractions and discuss their possible applications to probability theory. © 2007 Springer Science+Business Media, Inc.