Your search keyword '"Hermitian matrix"' showing total 10 results

1. Some New Algebraic Method Developments in the Characterization of Matrix Equalities.

Author

Tian, Yongge

Abstract

Algebraic expressions and equalities can be constructed arbitrarily in a given algebraic framework according to the operational rules provided, and thus it is a prominent and necessary task in mathematics and applications to construct, classify, and characterize various simple general algebraic expressions and equalities. As an update to this prominent topic in matrix algebra, this article reviews and improves upon the well-known block matrix methodology and matrix rank methodology in the construction and characterization of matrix equalities. We present a collection of fundamental and useful formulas for calculating the ranks of a wide range of block matrices and then derive from these rank formulas various valuable consequences. In particular, we present several groups of equivalent conditions in the characterizations of the Hermitian matrix, the skew-Hermitian matrix, the normal matrix, etc. [ABSTRACT FROM AUTHOR]

Published

2024

2. Determinantal polynomials and the base polynomial of a square matrix over a finite field

Author

Ballico, Edoardo

Published

2024

3. Determinantal polynomials and the base polynomial of a square matrix over a finite field

Author

Edoardo Ballico

Subjects

Finite field, Hermitian matrix, Base polynomial, Numerical range, Mathematics, QA1-939

Abstract

Purpose – The author studies forms over finite fields obtained as the determinant of Hermitian matrices and use these determinatal forms to define and study the base polynomial of a square matrix over a finite field. Design/methodology/approach – The authors give full proofs for the new results, quoting previous works by other authors in the proofs. In the introduction, the authors quoted related references. Findings – The authors get a few theorems, mainly describing some monic polynomial arising as a base polynomial of a square matrix. Originality/value – As far as the author knows, all the results are new, and the approach is also new.

Published

2024

4. Linear codes associated to determinantal varieties in the space of hermitian matrices.

Author

Singh, Kanchan, Pathak, Ritesh Kumar, and Singh, Sheo Kumar

Subjects

LINEAR codes, FINITE fields

Abstract

We introduce a new class of linear codes over a finite field associated to determinantal varieties in the space of hermitian matrices and determine their length, dimension and minimum distance along with the weight spectrum. [ABSTRACT FROM AUTHOR]

Published

2024

5. A New Extended Target Detection Method Based on the Maximum Eigenvalue of the Hermitian Matrix.

Author

Xu, Yong, Zhu, Yongfeng, and Song, Zhiyong

Subjects

*MATRICES (Mathematics), *EIGENVALUES, *RADAR cross sections, *CLUTTER (Radar), *RADAR targets, *LIKELIHOOD ratio tests

Abstract

In the field of radar target detection, the conventional approach is to employ the range profile energy accumulation method for detecting extended targets. However, this method becomes ineffective when dealing with non-stationary and non-uniform radar clutter scenarios, as well as long-distance targets with weak radar cross sections (RCSs). In such cases, the signal-to-noise ratio (SNR) of the target echo is severely degraded, rendering the energy accumulation detection algorithm unreliable. To address this issue, this paper presents a new extended target detection method based on the maximum eigenvalue of the Hermitian matrix. This method utilizes a detection model that incorporates observed data and employs the likelihood ratio test (LRT) theory to derive the maximum eigenvalue detector at low SNR. Specifically, the detector constructs a matrix using a sliding window block with the available data and then computes the maximum eigenvalue of the covariance matrix. Subsequently, the maximum eigenvalue matrix is transformed into a one-dimensional eigenvalue image, enabling extended target detection through analogy with the energy accumulation detection method. Furthermore, this paper analyzes the proposed extended target detection method from both theoretical and experimental perspectives, validating it through field-measured data. The results obtained from the measured data demonstrate that the method effectively enhances the SNR in low SNR conditions, thereby improving target detection performance. Additionally, the method exhibits robustness across different scattering center targets. [ABSTRACT FROM AUTHOR]

Published

2024

6. The Hermitian Solution to a New System of Commutative Quaternion Matrix Equations.

Author

Zhang, Yue, Wang, Qing-Wen, and Xie, Lv-Ming

Subjects

*QUATERNIONS, *EQUATIONS, *LEAST squares, *MATRICES (Mathematics), *COMMUTATIVE algebra

Abstract

This paper considers the Hermitian solutions of a new system of commutative quaternion matrix equations, where we establish both necessary and sufficient conditions for the existence of solutions. Furthermore, we derive an explicit general expression when it is solvable. In addition, we also provide the least squares Hermitian solution in cases where the system of matrix equations is not consistent. To illustrate our main findings, in this paper we present two numerical algorithms and examples. [ABSTRACT FROM AUTHOR]

Published

2024

7. Some New Algebraic Method Developments in the Characterization of Matrix Equalities

Author

Yongge Tian

Subjects

block matrix, Hermitian matrix, generalized inverse, matrix equality, normal matrix, range, Mathematics, QA1-939

Abstract

Algebraic expressions and equalities can be constructed arbitrarily in a given algebraic framework according to the operational rules provided, and thus it is a prominent and necessary task in mathematics and applications to construct, classify, and characterize various simple general algebraic expressions and equalities. As an update to this prominent topic in matrix algebra, this article reviews and improves upon the well-known block matrix methodology and matrix rank methodology in the construction and characterization of matrix equalities. We present a collection of fundamental and useful formulas for calculating the ranks of a wide range of block matrices and then derive from these rank formulas various valuable consequences. In particular, we present several groups of equivalent conditions in the characterizations of the Hermitian matrix, the skew-Hermitian matrix, the normal matrix, etc.

Published

2024

8. A New Extended Target Detection Method Based on the Maximum Eigenvalue of the Hermitian Matrix

Author

Yong Xu, Yongfeng Zhu, and Zhiyong Song

Subjects

extended target, range image, Hermitian matrix, eigenvalue of maximum, detection, Science

Abstract

In the field of radar target detection, the conventional approach is to employ the range profile energy accumulation method for detecting extended targets. However, this method becomes ineffective when dealing with non-stationary and non-uniform radar clutter scenarios, as well as long-distance targets with weak radar cross sections (RCSs). In such cases, the signal-to-noise ratio (SNR) of the target echo is severely degraded, rendering the energy accumulation detection algorithm unreliable. To address this issue, this paper presents a new extended target detection method based on the maximum eigenvalue of the Hermitian matrix. This method utilizes a detection model that incorporates observed data and employs the likelihood ratio test (LRT) theory to derive the maximum eigenvalue detector at low SNR. Specifically, the detector constructs a matrix using a sliding window block with the available data and then computes the maximum eigenvalue of the covariance matrix. Subsequently, the maximum eigenvalue matrix is transformed into a one-dimensional eigenvalue image, enabling extended target detection through analogy with the energy accumulation detection method. Furthermore, this paper analyzes the proposed extended target detection method from both theoretical and experimental perspectives, validating it through field-measured data. The results obtained from the measured data demonstrate that the method effectively enhances the SNR in low SNR conditions, thereby improving target detection performance. Additionally, the method exhibits robustness across different scattering center targets.

Published

2024

9. The Hermitian Solution to a New System of Commutative Quaternion Matrix Equations

Author

Yue Zhang, Qing-Wen Wang, and Lv-Ming Xie

Subjects

commutative quaternion algebra, matrix equations, Hermitian matrix, least squares solution, Mathematics, QA1-939

Abstract

This paper considers the Hermitian solutions of a new system of commutative quaternion matrix equations, where we establish both necessary and sufficient conditions for the existence of solutions. Furthermore, we derive an explicit general expression when it is solvable. In addition, we also provide the least squares Hermitian solution in cases where the system of matrix equations is not consistent. To illustrate our main findings, in this paper we present two numerical algorithms and examples.

Published

2024

10. Singular value and unitarily invariant norm inequalities for matrices

Author

Al-Natoor, Ahmad, Hirzallah, Omar, and Kittaneh, Fuad

Published

2024