Factorization of matrix and operator functions : the state space method
The present book deals with factorization problems for matrix and operator functions. The problems originate from, or are motivated by, the theory of non-selfadjoint operators, the theory of matrix polynomials, mathematical systems and control theory, the theory of Riccati equations, inversion of co...
Saved in:
| Main Authors: | , , , |
|---|---|
| Format: | Book |
| Language: | English |
| Published: |
Springer
2017
|
| Subjects: | |
| Online Access: | http://repository.vnu.edu.vn/handle/VNU_123/31728 |
| Tags: |
Add Tag
No Tags, Be the first to tag this record!
|
| Institution: | Vietnam National University, Hanoi |
| Language: | English |
| id |
oai:112.137.131.14:VNU_123-31728 |
|---|---|
| record_format |
dspace |
| spelling |
oai:112.137.131.14:VNU_123-317282020-06-17T01:54:38Z Factorization of matrix and operator functions : the state space method Bart, H. Gohberg, I. Ran, A.C.M. Kaashoek, M.A. Mathematics and Statistics ; Matrices ; Operator-valued functions ; Factorization (Mathematics) 515.7246 The present book deals with factorization problems for matrix and operator functions. The problems originate from, or are motivated by, the theory of non-selfadjoint operators, the theory of matrix polynomials, mathematical systems and control theory, the theory of Riccati equations, inversion of convolution operators, theory of job scheduling in operations research. The book systematically employs a geometric principle of factorization which has its origins in the state space theory of linear input-output systems and in the theory of characteristic operator functions. This principle allows one to deal with different factorizations from one point of view. Covered are canonical factorization, minimal and non-minimal factorizations, pseudo-canonical factorization, and various types of degree one factorization. Considerable attention is given to the matter of stability of factorization which in terms of the state space method involves stability of invariant subspaces.invariant subspaces. "The present book deals with factorization problems for matrix and operator functions. The problems originate from, or are motivated by, the theory of non-selfadjoint operators, the theory of matrix polynomials, mathematical systems and control theory, the theory of Riccati equations, inversion of convolution operators, theory of job scheduling in operations research." "The book systematically employs a geometric principle of factorization which has its origins in the state space theory of linear input-output systems and in the theory of characteristic operator functions. This principle allows one to deal with different factorizations from one point of view. Covered are canonical factorization, minimal and non-minimal factorizations, pseudo-canonical factorization, and various types of degree one factorization." "Considerable attention is given to the matter of stability of factorization which in terms of the state space method involves stability of invariant subspaces."--Jacket. 2017-04-20T07:13:24Z 2017-04-20T07:13:24Z 2008 Book 9783764382674 http://repository.vnu.edu.vn/handle/VNU_123/31728 en 409 p. application/pdf Springer |
| institution |
Vietnam National University, Hanoi |
| building |
VNU Library & Information Center |
| country |
Vietnam |
| collection |
VNU Digital Repository |
| language |
English |
| topic |
Mathematics and Statistics ; Matrices ; Operator-valued functions ; Factorization (Mathematics) 515.7246 |
| spellingShingle |
Mathematics and Statistics ; Matrices ; Operator-valued functions ; Factorization (Mathematics) 515.7246 Bart, H. Gohberg, I. Ran, A.C.M. Kaashoek, M.A. Factorization of matrix and operator functions : the state space method |
| description |
The present book deals with factorization problems for matrix and operator functions. The problems originate from, or are motivated by, the theory of non-selfadjoint operators, the theory of matrix polynomials, mathematical systems and control theory, the theory of Riccati equations, inversion of convolution operators, theory of job scheduling in operations research. The book systematically employs a geometric principle of factorization which has its origins in the state space theory of linear input-output systems and in the theory of characteristic operator functions. This principle allows one to deal with different factorizations from one point of view. Covered are canonical factorization, minimal and non-minimal factorizations, pseudo-canonical factorization, and various types of degree one factorization.
Considerable attention is given to the matter of stability of factorization which in terms of the state space method involves stability of invariant subspaces.invariant subspaces. |
| format |
Book |
| author |
Bart, H. Gohberg, I. Ran, A.C.M. Kaashoek, M.A. |
| author_facet |
Bart, H. Gohberg, I. Ran, A.C.M. Kaashoek, M.A. |
| author_sort |
Bart, H. |
| title |
Factorization of matrix and operator functions : the state space method |
| title_short |
Factorization of matrix and operator functions : the state space method |
| title_full |
Factorization of matrix and operator functions : the state space method |
| title_fullStr |
Factorization of matrix and operator functions : the state space method |
| title_full_unstemmed |
Factorization of matrix and operator functions : the state space method |
| title_sort |
factorization of matrix and operator functions : the state space method |
| publisher |
Springer |
| publishDate |
2017 |
| url |
http://repository.vnu.edu.vn/handle/VNU_123/31728 |
| _version_ |
1680967727344254976 |