AbstractA new formula for matrix partial fraction expansion is established. It only involves the inversion of the product of Vandermonde and Stanley matrices with Kronecker expansion and the multiplication of the resulting matrix by the Rosenbrock coefficient matrix. It is much simpler than either the indirect method or methods based on the Lagrange-Sylvester interpolation
A novel method is presented to determine the SmithMacmillan form of a rationalm times nmatrixR(p)fro...
Some important applicative problems require the evaluation of functions of large and sparse and/or l...
Explains the partial fraction expansion procedure when the denominator has linear roots, and applies...
AbstractThis paper is concerned with the computation of residues of the partial fraction expansion o...
AbstractThis paper describes the relationships between projectors, solvents, interpolating polynomia...
This paper deals with the description of a general method for calculating the residues of a linear s...
AbstractNine methods for expressing a proper rational function in terms of partial fractions are pre...
AbstractA new method for partial fraction expansion is established. It only involves numerical matri...
A simple and novel method for evaluating the partial fraction expansion of proper rational functions...
summary:A new form of the coprime polynomial fraction $C(s)\,F(s)^{-1}$ of a transfer function matri...
There are several methods of calculating the unknown coefficients appearing in the partial fraction ...
AbstractSeveral algorithms for the computation of coprime matrix fraction descriptions have been pro...
Explains the partial fraction expansion procedure when the denominator has repeated linear roots, an...
Explains the partial fraction expansion procedure when the denominator has a mixture of linear roots...
A new O(N**2) algorithm for partial fraction expansion with multiple poles is presented, which is si...
A novel method is presented to determine the SmithMacmillan form of a rationalm times nmatrixR(p)fro...
Some important applicative problems require the evaluation of functions of large and sparse and/or l...
Explains the partial fraction expansion procedure when the denominator has linear roots, and applies...
AbstractThis paper is concerned with the computation of residues of the partial fraction expansion o...
AbstractThis paper describes the relationships between projectors, solvents, interpolating polynomia...
This paper deals with the description of a general method for calculating the residues of a linear s...
AbstractNine methods for expressing a proper rational function in terms of partial fractions are pre...
AbstractA new method for partial fraction expansion is established. It only involves numerical matri...
A simple and novel method for evaluating the partial fraction expansion of proper rational functions...
summary:A new form of the coprime polynomial fraction $C(s)\,F(s)^{-1}$ of a transfer function matri...
There are several methods of calculating the unknown coefficients appearing in the partial fraction ...
AbstractSeveral algorithms for the computation of coprime matrix fraction descriptions have been pro...
Explains the partial fraction expansion procedure when the denominator has repeated linear roots, an...
Explains the partial fraction expansion procedure when the denominator has a mixture of linear roots...
A new O(N**2) algorithm for partial fraction expansion with multiple poles is presented, which is si...
A novel method is presented to determine the SmithMacmillan form of a rationalm times nmatrixR(p)fro...
Some important applicative problems require the evaluation of functions of large and sparse and/or l...
Explains the partial fraction expansion procedure when the denominator has linear roots, and applies...
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