AbstractLet An,n∈N, be a sequence of k×k matrices which converge to a matrix A as n→∞. It is shown that if xn,n∈N, is a sequence of nonnegative nonzero vectors such thatxn+1=Anxn,n∈N, then ρ=limn→∞‖xn‖n is an eigenvalue of the limiting matrix A with a nonnegative eigenvector. This result implies the weak form of the Perron–Frobenius theorem and for the class of nonnegative solutions it improves the conclusion of a Perron type theorem for difference equations
AbstractIt is well known that for a nonnegative matrix A, the smallest row sum R′(A) and the largest...
AbstractUsing the techniques of max algebra, a new proof of Al’pin’s lower and upper bounds for the ...
AbstractThe Stein–Rosenberg theorem is extended and generalized to the class of nonnegative splittin...
AbstractLet An,n∈N, be a sequence of k×k matrices which converge to a matrix A as n→∞. It is shown t...
AbstractWe extend the theory of nonnegative matrices to the matrices that have some negative entries...
AbstractWe extend here the Perron–Frobenius theory of nonnegative matrices to certain complex matric...
Power nonnegative matrices are defined as complex matrices having at least one nonnegative integer p...
AbstractLet Ak,k=0,1,2,…, be a sequence of real nonsingular n×n matrices which converge to a nonsing...
AbstractIt is well known that the Perron root r(A) of a nonnegative matrix A lies between the smalle...
AbstractAn ML-matrix is a matrix where all off-diagonal elements are nonnegative. A simple inequalit...
AbstractWe present an extension of Perron–Frobenius theory to the spectra and numerical ranges of Pe...
AbstractTwo different generalizations of the Perron—Frobenius theory to the matrix pencil Ax = λBx a...
AbstractFor nonnegative matrices A, the well known Perron–Frobenius theory studies the spectral radi...
AbstractLet A ϵ Mn. In terms of Perron roots and Perron vectors of two positive (or irreducible nonn...
AbstractMotivated by a work of Boros, Brualdi, Crama and Hoffman, we consider the sets of (i) possib...
AbstractIt is well known that for a nonnegative matrix A, the smallest row sum R′(A) and the largest...
AbstractUsing the techniques of max algebra, a new proof of Al’pin’s lower and upper bounds for the ...
AbstractThe Stein–Rosenberg theorem is extended and generalized to the class of nonnegative splittin...
AbstractLet An,n∈N, be a sequence of k×k matrices which converge to a matrix A as n→∞. It is shown t...
AbstractWe extend the theory of nonnegative matrices to the matrices that have some negative entries...
AbstractWe extend here the Perron–Frobenius theory of nonnegative matrices to certain complex matric...
Power nonnegative matrices are defined as complex matrices having at least one nonnegative integer p...
AbstractLet Ak,k=0,1,2,…, be a sequence of real nonsingular n×n matrices which converge to a nonsing...
AbstractIt is well known that the Perron root r(A) of a nonnegative matrix A lies between the smalle...
AbstractAn ML-matrix is a matrix where all off-diagonal elements are nonnegative. A simple inequalit...
AbstractWe present an extension of Perron–Frobenius theory to the spectra and numerical ranges of Pe...
AbstractTwo different generalizations of the Perron—Frobenius theory to the matrix pencil Ax = λBx a...
AbstractFor nonnegative matrices A, the well known Perron–Frobenius theory studies the spectral radi...
AbstractLet A ϵ Mn. In terms of Perron roots and Perron vectors of two positive (or irreducible nonn...
AbstractMotivated by a work of Boros, Brualdi, Crama and Hoffman, we consider the sets of (i) possib...
AbstractIt is well known that for a nonnegative matrix A, the smallest row sum R′(A) and the largest...
AbstractUsing the techniques of max algebra, a new proof of Al’pin’s lower and upper bounds for the ...
AbstractThe Stein–Rosenberg theorem is extended and generalized to the class of nonnegative splittin...