AbstractSeries, parallel, and state-space canonical forms associated with the matrix quadratic equation and its inverse are established. Equivalent block representations are constructed. Analysis procedures are outlined, and typical applications employing series representations are computed
In this paper, we consider the quadratic inverse eigenvalue problem (QIEP) of constructing real symm...
AbstractWe discuss some properties of a quadratic matrix equation with some restrictions, then use t...
We showed earlier that a state variable for a LTI system can be computed factorizing a two-variable ...
Structure Preserving Transformations in the present definition provide a formal means by which every...
Quadratic pencils arising from applications are often inherently structured. Factors contributing to...
AbstractGiven a pair of distinct eigenvalues (λ1,λ2) of an n×n quadratic matrix polynomial Q(λ) with...
Solving the quadratic eigenvalue problem is critical in several applications in control and systems ...
AbstractThe Jordan normal form for complex matrices is extended to admit “canonical triples” of matr...
Given a pair of distinct \e s $(\l_1,\l_2)$ of an $\nbyn$ quadratic matrix polynomial $Q(\l)$ with ...
summary:Analysis of a non-classically damped engineering structure, which is subjected to an externa...
Klauder JR, Streit L. Properties of "Quadratic'' Canonical Commutation Relation Representations. Jou...
Given a pair of distinct eigenvalues (λ1, λ2) of an n×n quadratic matrix polyno-mial Q(λ) with nonsi...
Symbolic computation techniques are used to obtain a canonical form for polynomial matrices arising ...
AbstractThe trace takes bilinear forms over a separable field extension to certain bilinear forms ov...
Given the linear matrix equation AXB=C, we partition it into the form A1X11B1+A1X12B2+A2X21B1+A2X22B...
In this paper, we consider the quadratic inverse eigenvalue problem (QIEP) of constructing real symm...
AbstractWe discuss some properties of a quadratic matrix equation with some restrictions, then use t...
We showed earlier that a state variable for a LTI system can be computed factorizing a two-variable ...
Structure Preserving Transformations in the present definition provide a formal means by which every...
Quadratic pencils arising from applications are often inherently structured. Factors contributing to...
AbstractGiven a pair of distinct eigenvalues (λ1,λ2) of an n×n quadratic matrix polynomial Q(λ) with...
Solving the quadratic eigenvalue problem is critical in several applications in control and systems ...
AbstractThe Jordan normal form for complex matrices is extended to admit “canonical triples” of matr...
Given a pair of distinct \e s $(\l_1,\l_2)$ of an $\nbyn$ quadratic matrix polynomial $Q(\l)$ with ...
summary:Analysis of a non-classically damped engineering structure, which is subjected to an externa...
Klauder JR, Streit L. Properties of "Quadratic'' Canonical Commutation Relation Representations. Jou...
Given a pair of distinct eigenvalues (λ1, λ2) of an n×n quadratic matrix polyno-mial Q(λ) with nonsi...
Symbolic computation techniques are used to obtain a canonical form for polynomial matrices arising ...
AbstractThe trace takes bilinear forms over a separable field extension to certain bilinear forms ov...
Given the linear matrix equation AXB=C, we partition it into the form A1X11B1+A1X12B2+A2X21B1+A2X22B...
In this paper, we consider the quadratic inverse eigenvalue problem (QIEP) of constructing real symm...
AbstractWe discuss some properties of a quadratic matrix equation with some restrictions, then use t...
We showed earlier that a state variable for a LTI system can be computed factorizing a two-variable ...
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