Distributional embeddings of the first limit Bourgain-Rosenthal-Schechtman space

Abstract

We classify the distributional self-embeddings of the centered first limit Bourgain-Rosenthal-Schechtman space Rωp,0, 1<p<∞. Using a Boolean rigidity principle for its canonical independent-sum realization, we show that every such embedding is induced by a finite packing of Bernoulli factors. As a consequence, we also prove that Rωp,0 admits no proper non-zero internal compressions. Moreover, for p2 N, we obtain a complete description of the linear isometric embeddings of the non-centered space Rωp, and, for p≠2, we determine its group of surjective linear isometries.