On Isometric Embedding pm S∞n and Unique operator space structure

Abstract

We study existence of linear isometric embedding of pm into S∞, for 1≤ p< ∞ and unique operator space structure on two dimensional Banach spaces. For p∈(2,∞)\1\, we show that indeed p2 does not embed isometrically into S∞. This verifies a guess of Pisier and broadly generalizes the main result of GUR18. We also show that S1m does not embed isometrically into Spn for all 1<p<∞ and m≥ 2. As a consequence, we establish noncommutative analogue of some of the results in LYS04. We also show that (C2,\|.\|Bp,q) does not embed isometrically into S∞ for 2<p,q<∞. The main ingredients in our proofs are notions of Birkhoff-James orthogonality and norm parallelism for operators on Hilbert spaces. These enable us to deploy `infinite descent' type of arguments to obtain contradictions. Our approach is new even in the commutative case. We prove that (C2,\|.\|Bp,q) does not have unique operator space structure whenever (p,q)∈(1,∞)×[1,∞)[1,∞)×(1,∞) by showing that they do not have Property P or two summing property. In view of MIPV19, this produces genuinely new examples of two dimensional Banach spaces without unique operator space structure, providing a partial answer to a question of Paulsen. In this case, we derive our result by transferring the problem to real case and applying known results of ARFJS95.