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Definition of Singular matrix
1. Noun. A square matrix whose determinant is zero.
Lexicographical Neighbors of Singular Matrix
Literary usage of Singular matrix
Below you will find example usage of this term as found in modern and/or classical literature:
1. Bulletin of the American Mathematical Society by American Mathematical Society (1919)
"Let M be the given non-singular matrix for which it is desired to determine
whether M is of the ... One may select a non-singular matrix, P, such that PMP-1 ..."
2. Selected Proceedings of the Symposium on Inference for Stochastic Processes by Ishwar V. Basawa, C. C. Heyde, Robert Lee Taylor (2001)
"Lg for some non-singular matrix A(0, </>), then clearly the matrix in (2.8) has
rank r so that Mg — Bk. Conversely, if Mg — Bk ie the rank of the matrix in ..."
3. Introduction to Higher Algebra by Maxime Bôcher (1907)
"is a non-singular matrix of determinant a, and if A^ denote in the ordinary way
the cofactors of the elements of a, the matrix ."nn called the inverse of a, ..."
4. SAS/IML 9.1 by SAS Institute (2004)
"In this example, if a singular matrix is passed to the INV function, the IML
procedure pauses and executes the pushed code to make the result for the ..."
5. Proceedings of the Berkeley-Ames Conference on Nonlinear Problems in Control by Louis R. Hunt, Clyde Martin (1984)
"Then it is known [10] that there exist a non-singular matrix V from which we can
define R in equation (21) and a non-singular matrix T resulting in a ..."
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