论文信息 - The constrained bilinear form and the C-numerical range

The constrained bilinear form and the C-numerical range

Abstract Let V be an n-dimentional unitary space with inner product (·,·) and S the set {x∈V:(x, x)=1}. For any A∈Hom(V, V) and q∈ C with ∣q∣⩽1, we define W(A:q)={(Ax, y):x, y∈S, (x, y)=q} . If q=1, then W(A:q) is just the classical numerical range {(Ax, x):x∈S}, the convexity of which is well known. Another generalization of the numerical range is the C-numerical range, which is defined to be the set W C (A)={ tr (CU ∗ AU):U unitary } where C∈Hom(V, V). In this note, we prove that W(A:q) is always convex and that WC(A) is convex for all A if rank C=1 or n=2.

Nam-Kiu Tsing

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