Orthogonality in Banach Spaces via projective tensor product

Abstract

Let X be a complex Banach space and x,y∈ X. By definition, we say that x is Birkhoff-James orthogonal to y if \|x+λ y\|X ≥ \|x\|X for all λ ∈ C. We prove that x is Birkhoff-James orthogonal to y if and only if there exists a semi-inner product on X such that \|\| = 1, (x,x)=\|x\|2 and (x,y)=0. A similar result holds for C*-algebras. A key point in our approach to orthogonality is the representations of bounded bilinear maps via projective tensor product spaces.