The C-Numerical Range for Schatten-Class Operators

Abstract

We generalize the C-numerical range WC(T) from trace-class to Schatten-class operators, i.e. to C∈ Bp( H) and T∈ Bq( H) with 1/p + 1/q = 1, and show that its closure is always star-shaped with respect to the origin. For q ∈ (1,∞], this is equivalent to saying that the closure of the image of the unitary orbit of T∈ Bq( H) under any continous linear functional L∈( Bq( H))' is star-shaped with respect to the origin. For q=1, one has star-shapedness with respect to tr(T)We(L), where We(L) denotes the essential range of L. Moreover, the closure of WC(T) is convex if C or T is normal with collinear eigenvalues. If C and T are both normal, then the C-spectrum of T is a subset of the C-numerical range, which itself is a subset of the closure of the convex hull of the C-spectrum. This closure coincides with the closure of the C-numerical range if, in addition, the eigenvalues of C or T are collinear.