normal matrices造句
例句與造句
- He is perhaps best known for his work on non-normal matrices and operators.
- For example, the spectral theorem for normal matrices states every normal matrix is unitarily diagonalizable.
- For example, as mentioned below, the problem of finding eigenvalues for normal matrices is always well-conditioned.
- The diagonal form for diagonalizable matrices, for instance normal matrices, is a special case of the Jordan normal form.
- The spectral theorem for normal matrices is a special case of the more general Schur decomposition which holds for all square matrices.
- It's difficult to find normal matrices in a sentence. 用normal matrices造句挺難的
- The concept of normal matrices can be extended to normal operators on infinite dimensional Hilbert spaces and to normal elements in C *-algebras.
- A theorem due to Ikramov generalizes the law of inertia to any normal matrices " A " and " B ":
- *PM : proof of theorem for normal matrices, id = 7530-- WP guess : proof of theorem for normal matrices-- Status:
- *PM : proof of theorem for normal matrices, id = 7530-- WP guess : proof of theorem for normal matrices-- Status:
- *PM : commuting normal matrices are simultaneously diagonalizable, id = 7295-- WP guess : commuting normal matrices are simultaneously diagonalizable-- Status:
- *PM : commuting normal matrices are simultaneously diagonalizable, id = 7295-- WP guess : commuting normal matrices are simultaneously diagonalizable-- Status:
- When comparing the two results, a rough analogy can be made with the relationship between the spectral theorem for normal matrices and the Jordan canonical form.
- Another way of stating the spectral theorem is to say that normal matrices are precisely those matrices that can be represented by a diagonal matrix with respect to a properly chosen orthonormal basis of.
- For example, AW *-algebras can be classified according to the behavior of their projections, and decompose into normal matrices with entries in an AW *-algebra can always be diagonalized.
- If " A " and " B " are normal matrices, then " A " and " B " are congruent if and only if they have the same number of eigenvalues on each open ray from the origin in the complex plane.
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