k-Extreme Points in Symmetric Spaces of Measurable Operators

Abstract

Let M be a semifinite von Neumann algebra with a faithful, normal, semifinite trace τ and E be a strongly symmetric Banach function space on [0,τ(1)). We show that an operator x in the unit sphere of E(M,τ) is k-extreme, k∈ N, whenever its singular value function μ(x) is k-extreme and one of the following conditions hold (i) μ(∞,x)=t∞μ(t,x)=0 or (ii) n(x)M n(x*)=0 and |x|≥ μ(∞,x)s(x), where n(x) and s(x) are null and support projections of x, respectively. The converse is true whenever M is non-atomic. The global k-rotundity property follows, that is if M is non-atomic then E is k-rotund if and only if E(M,τ) is k-rotund. As a consequence of the noncommutive results we obtain that f is a k-extreme point of the unit ball of the strongly symmetric function space E if and only if its decreasing rearrangement μ(f) is k-extreme and |f|≥ μ(∞,f). We conclude with the corollary on orbits (g) and '(g). We get that f is a k-extreme point of the orbit (g), g∈ L1+L∞, or '(g), g∈ L1[0,α), α<∞, if and only if μ(f)=μ(g) and |f|≥ μ(∞,f). From this we obtain a characterization of k-extreme points in Marcinkiewicz spaces.