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Quantum Algorithms
On the Continuity of Schur-Horn Mapping
arXiv
Authors: Hengzhun Chen, Yingzhou Li
Year
2024
Paper ID
65937
Status
Preprint
Abstract Read
~2 min
Abstract Words
113
Citations
N/A
Abstract
The Schur-Horn theorem is a well-known result that characterizes the relationship between the diagonal elements and eigenvalues of a symmetric (Hermitian) matrix. In this paper, we extend this theorem by exploring the eigenvalue perturbation of a symmetric (Hermitian) matrix with fixed diagonals, which is referred to as the continuity of the Schur-Horn mapping. We introduce a concept called strong Schur-Horn continuity, characterized by minimal constraints on the perturbation. We demonstrate that several categories of matrices exhibit strong Schur-Horn continuity. Leveraging this notion, along with a majorization constraint on the perturbation, we prove the Schur-Horn continuity for general symmetric (Hermitian) matrices. The Schur-Horn continuity finds applications in oblique manifold optimization related to quantum computing.
Why This Paper Matters
- It adds a 2024 reference point for readers tracking recent quantum research.
- The Schur-Horn theorem is a well-known result that characterizes the relationship between the diagonal elements and eigenvalues of a symmetric (Hermitian) matrix.
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