Maximal resolvability of totally bounded and ℵ0-bounded groups

A new original method for proving resolvability of topological groups is decribed. With the aid of this method, maximal resolvability is proved for some classes of topological groups, in particular, for the class of totally bounded groups.

Let G be a permutation group on a set Ω such that G has no fixed points in Ω. If, for a given positive integer m, the cardinalities |Γ g \Γ | is at most m for all g ∈ G and Γ ⊆ Ω, then G is said to have bounded movement m on Ω. When the maximum of |Γ g \Γ | over all g ∈ G and Γ ⊆ Ω is equal to m, we

Let {T (t)} t≥0 be a C 0 -semigroup on a Banach space X with generator A, and let T be the space of all x ∈ X such that the local resolvent λ → R(λ, A)x has a bounded holomorphic extension to the right half -plane. For the class of integrable functions φ on [0, ∞) whose Fourier transforms are integ