例句與造句

1. Clearly, a generalized eigenvector of rank 1 is an ordinary eigenvector.
2. Thus is an eigenvalue of with generalized eigenvector.
3. as a generalized eigenvector of rank 3 corresponding to \ lambda _ 1 = 5.
4. Each vector in the union is either an eigenvector or a generalized eigenvector of " A ".
5. More generally, if is any invertible matrix, and is an eigenvalue of with generalized eigenvector, then.
6. It's difficult to find generalized eigenvector in a sentence. 用generalized eigenvector造句挺難的
7. Since any eigenvector is also a generalized eigenvector, the geometric multiplicity is less than or equal to the algebraic multiplicity.
8. Any eigenvalue of has ordinary eigenvectors associated to it, for if is the smallest integer such that for a generalized eigenvector, then is an ordinary eigenvector.
9. Once we have determined the number of generalized eigenvectors of each rank that a canonical basis has, we can obtain the vectors explicitly ( see generalized eigenvector ).
10. The vector \ bold x _ j, given by ( ), is a generalized eigenvector of rank " j " corresponding to the eigenvalue \ lambda.
11. A vector \ bold x _ m is a "'generalized eigenvector of rank " m " "'of the matrix A and corresponding to the eigenvalue \ lambda if
12. That is, it is the space of generalized eigenvectors ( 1st sense ), where a generalized eigenvector is any vector which eventually becomes 0 if ?I  " A is applied to it enough times successively"
13. Since \ lambda _ 1 corresponds to a single chain of three linearly independent generalized eigenvectors, we know that there is a generalized eigenvector \ bold x _ 3 of rank 3 corresponding to \ lambda _ 1 such that
14. In linear algebra, a "'generalized eigenvector "'of an " n " ?" n " vector which satisfies certain criteria which are more relaxed than those for an ( ordinary ) eigenvector.
15. A generalized eigenvector x _ i corresponding to \ lambda _ i, together with the matrix ( A-\ lambda _ i I ) generate a Jordan chain of linearly independent generalized eigenvectors which form a basis for an invariant subspace of V.
16. The variable \ rho _ k designates the number of linearly independent generalized eigenvectors of rank " k " ( generalized eigenvector rank; see generalized eigenvector ) corresponding to the eigenvalue \ lambda _ i that will appear in a canonical basis for A.
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