AbstractIt is proved that a Perron type theorem holds for positive maps with bilinear components whose defining matrices satisfy a maximality assumption with respect to certain entry ratios. The result is applied to a life history model which includes sexual reproduction
The Frobenius-Perron operator describes the evolution of density functions in a dynamical system. Fi...
AbstractThe dynamics of a 2D positive system depends on the pair of nonnegative square matrices that...
This paper was included in a list of ``10 Notable Papers from the journal Linear Algebra \& Its Appl...
The Perron-Frobenius Theorem says that if A is a nonnegative square matrix some power of which is po...
In his work on the foundations of geometry, Hilbert observed that a formula which appeared in works ...
We present positive maps and matrix inequalities for variables from the positive cone. These inequal...
AbstractWe present a new extension of the well-known Perron–Frobenius theorem to regular matrix pair...
This paper deals with the Perron root of nonnegative irreducible matrices, all of whose entries are ...
The Inverse Frobenius-Perron problem (IFPP) concerns the creation of discrete chaotic mappings with ...
A result is presented describing the eigenvectors of a perturbed matrix, for a class of structured p...
AbstractTwo different generalizations of the Perron—Frobenius theory to the matrix pencil Ax = λBx a...
AbstractWe present an extension of Perron–Frobenius theory to the spectra and numerical ranges of Pe...
AbstractWe consider maps fK(v)=minA∈KAv and gK(v)=maxA∈KAv, where K is a finite set of nonnegative m...
Abstract. We extend the notions of irreducibility and periodicity of a sto-chastic matrix to a unita...
In this work we establish conditions which guarantee the existence of (strictly) positive steady sta...
The Frobenius-Perron operator describes the evolution of density functions in a dynamical system. Fi...
AbstractThe dynamics of a 2D positive system depends on the pair of nonnegative square matrices that...
This paper was included in a list of ``10 Notable Papers from the journal Linear Algebra \& Its Appl...
The Perron-Frobenius Theorem says that if A is a nonnegative square matrix some power of which is po...
In his work on the foundations of geometry, Hilbert observed that a formula which appeared in works ...
We present positive maps and matrix inequalities for variables from the positive cone. These inequal...
AbstractWe present a new extension of the well-known Perron–Frobenius theorem to regular matrix pair...
This paper deals with the Perron root of nonnegative irreducible matrices, all of whose entries are ...
The Inverse Frobenius-Perron problem (IFPP) concerns the creation of discrete chaotic mappings with ...
A result is presented describing the eigenvectors of a perturbed matrix, for a class of structured p...
AbstractTwo different generalizations of the Perron—Frobenius theory to the matrix pencil Ax = λBx a...
AbstractWe present an extension of Perron–Frobenius theory to the spectra and numerical ranges of Pe...
AbstractWe consider maps fK(v)=minA∈KAv and gK(v)=maxA∈KAv, where K is a finite set of nonnegative m...
Abstract. We extend the notions of irreducibility and periodicity of a sto-chastic matrix to a unita...
In this work we establish conditions which guarantee the existence of (strictly) positive steady sta...
The Frobenius-Perron operator describes the evolution of density functions in a dynamical system. Fi...
AbstractThe dynamics of a 2D positive system depends on the pair of nonnegative square matrices that...
This paper was included in a list of ``10 Notable Papers from the journal Linear Algebra \& Its Appl...
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