AbstractWe consider the spectral properties of matrix polynomials over the max algebra. In particular, we show how the Perron–Frobenius theorem for the max algebra extends to such polynomials and illustrate the relevance of this for multistep difference equations in the max algebra. We also present a number of inequalities for the largest max eigenvalue of a matrix polynomial
If A an n × n nonnegative, irreducible matrix, then there exists μ(A) > 0, and a positi...
The max-plus algebra defined in the set ! [ f\Gamma1g is an algebra with two binary operations \Phi ...
AbstractWe present an extension of Perron–Frobenius theory to the spectra and numerical ranges of Pe...
We consider the spectral properties of matrix polynomials over the max algebra. In particular, we sh...
We consider the spectral properties of matrix polynomials over the max algebra. In particular, we sh...
We consider the spectral properties of matrix polynomials over the max algebra. In particular, we sh...
AbstractWe consider the spectral properties of matrix polynomials over the max algebra. In particula...
This thesis is concerned with the correspondence between the max algebra and non-negative linear al...
This thesis is concerned with the correspondence between the max algebra and non-negative linear al...
This thesis is concerned with the correspondence between the max algebra and non-negative linear alg...
AbstractIf A an n × n nonnegative, irreducible matrix, then there exists μ(A) > 0, and a positive ve...
AbstractUsing the techniques of max algebra, a new proof of Al’pin’s lower and upper bounds for the ...
Max-plus matrix polynomial eigenvalues provide a useful approximation to the order of magnitude of t...
Elsner L, van den Driessche P. Bounds for the Perron root using max eigenvalues. Linear Algebra and ...
summary:We discuss the eigenvalue problem in the max-plus algebra. For a max-plus square matrix, the...
If A an n × n nonnegative, irreducible matrix, then there exists μ(A) > 0, and a positi...
The max-plus algebra defined in the set ! [ f\Gamma1g is an algebra with two binary operations \Phi ...
AbstractWe present an extension of Perron–Frobenius theory to the spectra and numerical ranges of Pe...
We consider the spectral properties of matrix polynomials over the max algebra. In particular, we sh...
We consider the spectral properties of matrix polynomials over the max algebra. In particular, we sh...
We consider the spectral properties of matrix polynomials over the max algebra. In particular, we sh...
AbstractWe consider the spectral properties of matrix polynomials over the max algebra. In particula...
This thesis is concerned with the correspondence between the max algebra and non-negative linear al...
This thesis is concerned with the correspondence between the max algebra and non-negative linear al...
This thesis is concerned with the correspondence between the max algebra and non-negative linear alg...
AbstractIf A an n × n nonnegative, irreducible matrix, then there exists μ(A) > 0, and a positive ve...
AbstractUsing the techniques of max algebra, a new proof of Al’pin’s lower and upper bounds for the ...
Max-plus matrix polynomial eigenvalues provide a useful approximation to the order of magnitude of t...
Elsner L, van den Driessche P. Bounds for the Perron root using max eigenvalues. Linear Algebra and ...
summary:We discuss the eigenvalue problem in the max-plus algebra. For a max-plus square matrix, the...
If A an n × n nonnegative, irreducible matrix, then there exists μ(A) > 0, and a positi...
The max-plus algebra defined in the set ! [ f\Gamma1g is an algebra with two binary operations \Phi ...
AbstractWe present an extension of Perron–Frobenius theory to the spectra and numerical ranges of Pe...
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