Isometries of combinatorial Tsirelson spaces

Abstract

We extend existing results that characterize isometries on the Tsirelson-type spaces T[1n, S1] (n∈ N, n≥ 2) to the class T[θ, Sα] (θ ∈ (0, 12], 1≤slant α < ω1), where Sα denote the Schreier families of order α. We prove that every isometry on T[θ, S1] (θ ∈ (0, 12]) is determined by a permutation of the first θ-1 elements of the canonical unit basis followed by a possible sign-change of the corresponding coordinates together with a sign-change of the remaining coordinates. Moreover, we show that for the spaces T[θ, Sα] (θ ∈ (0, 12], 2≤slant α < ω1) the isometries exhibit a more rigid character, namely, they are all implemented by a sign-change operation of the vector coordinates.