Isometric Embeddability of Sqm into Spn

Abstract

In this paper, we study existence of isometric embedding of Sqm into Spn, where 1≤ p≠ q≤ ∞ and n≥ m≥ 2. We show that for all n≥ m≥ 2 if there exists a linear isometry from Sqm into Spn, where (q,p)∈(1,∞]×(1,∞) (1,∞)\3\×\1,∞\ and p≠ q, then we must have q=2. This mostly generalizes a classical result of Lyubich and Vaserstein. We also show that whenever Sq embeds isometrically into Sp for (q,p)∈ (1,∞)×[2,∞ )[4,∞)×\1\ \∞\×( 1,∞)[2,∞)×\∞\ with p≠ q, we must have q=2. Thus, our work complements work of Junge, Parcet, Xu and others on isometric and almost isometric embedding theory on non-commutative Lp-spaces. Our methods rely on several new ingredients related to perturbation theory of linear operators, namely Kato-Rellich theorem, theory of multiple operator integrals and Birkhoff-James orthogonality, followed by thorough and careful case by case analysis. The question whether for m≥ 2 and 1<q<2, Sqm embeds isometrically into S∞n, was left open in Bull. London Math. Soc. 52 (2020) 437-447.