Eigenvalues of Majorized Hermitian Matrices
نویسنده
چکیده
Answering a question raised by S. Friedland, we show that the possible eigenvalues of Hermitian matrices (or compact operators) A, B, and C with C ≤ A+B are given by the same inequalities as in Klyachko’s theorem for the case where C = A + B, except that the equality corresponding to tr(C) = tr(A) + tr(B) is replaced by the inequality corresponding to tr(C) ≤ tr(A) + tr(B). The possible types of finitely generated torsion modules A, B, and C over a discrete valuation ring such that there is an exact sequence B → C → A are characterized by the same inequalities.
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