Linear maps on L(pn,pm), (p∈ \1,∞\) preserving parallel pairs

Abstract

Two vectors x,y of a Banach space are said to form a parallel (resp. triangle equality attaining or TEA) pair if \|x+λ y\|=\|x\|+\|y\| holds for some scalar λ with |λ|=1 (resp. λ=1). For p∈ \1,∞\, and m,n≥ 2, we study the linear maps T: L(pn, pm) L(pn,pm) that preserve parallel (resp. TEA) pairs, that is, those linear maps T for which T(A),T(B) form a parallel (resp. TEA) pair whenever A,B form a parallel (resp. TEA) pair of L(pn,pm). We prove that if T is non-zero, then the following are equivalent: (1) T preserves TEA pairs. (2) T preserves parallel pairs and rank(T)>1. (3) T preserves parallel pairs and T is invertible. (4) T is a scalar multiple of an isometry.