DOIAbstract
AbstractWe consider the minimum spectral radius for an n × n matrix of 0's and 1's having a specified number τ of 0's. We determine this minimum spectral radius when τ ⩽ ⌊n24⌋
AbstractWe consider the minimum spectral radius for an n × n matrix of 0's and 1's having a specified number τ of 0's. We determine this minimum spectral radius when τ ⩽ ⌊n24⌋
AbstractThe generalized spectral radius (GSR) is a fundamental concept in studying the regularity of...
Abstract: Let B2m denote the Brualdi-Li matrix,and let ρ(B2m) denote the spectral radius of Brualdi-...
AbstractLet Ψ be a bounded set of n×n nonnegative matrices in max algebra. In this paper we propose ...
AbstractWe consider the minimum spectral radius for an n×n matrix of 0's and 1's having a specified ...
AbstractWe consider the minimum spectral radius for an n×n matrix of 0's and 1's having a specified ...
AbstractLet A be an n×n matrix with eigenvalues λ1,λ2,…,λn, and let m be an integer satisfying rank(...
Abstract Let A 1 , A 2 , … , A k $A_{1}, A_{2},\ldots, A_{k}$ be nonnegative matrices. In this paper...
AbstractWe determine the maximum spectral radius for 0–1 matrices with m2 + l ones for l=2m, 2m − 3 ...
We obtain inequalities involving numerical radius of a matrix A∈Mn(ℂ). Using this result, we find up...
Let A be an n x n matrix with eigenvalues lambda(1),lambda 2,...,lambda(n), and let m be an integer ...
Let C(r)=[Cij], r=1,2,…,R, be block m×m matrices where Cij(r) are nonnegative Ni×Nj matrices for i,j...
Abstract. A.M. Ostrowski in 1951 gave two well-known upper bounds for the spectral radius of nonnega...
AbstractLet C(r)=[Cij], r=1,2,…,R, be block m×m matrices where Cij(r) are nonnegative Ni×Nj matrices...
AbstractIf a matrix A of unit norm on n-dimensional Hilbert space has eigenvalues close to zero, the...
In this paper we show new formulas for the spectral radius and the spectral subradius of a set of ma...
AbstractThe generalized spectral radius (GSR) is a fundamental concept in studying the regularity of...
Abstract: Let B2m denote the Brualdi-Li matrix,and let ρ(B2m) denote the spectral radius of Brualdi-...
AbstractLet Ψ be a bounded set of n×n nonnegative matrices in max algebra. In this paper we propose ...
AbstractWe consider the minimum spectral radius for an n×n matrix of 0's and 1's having a specified ...
AbstractWe consider the minimum spectral radius for an n×n matrix of 0's and 1's having a specified ...
AbstractLet A be an n×n matrix with eigenvalues λ1,λ2,…,λn, and let m be an integer satisfying rank(...
Abstract Let A 1 , A 2 , … , A k $A_{1}, A_{2},\ldots, A_{k}$ be nonnegative matrices. In this paper...
AbstractWe determine the maximum spectral radius for 0–1 matrices with m2 + l ones for l=2m, 2m − 3 ...
We obtain inequalities involving numerical radius of a matrix A∈Mn(ℂ). Using this result, we find up...
Let A be an n x n matrix with eigenvalues lambda(1),lambda 2,...,lambda(n), and let m be an integer ...
Let C(r)=[Cij], r=1,2,…,R, be block m×m matrices where Cij(r) are nonnegative Ni×Nj matrices for i,j...
Abstract. A.M. Ostrowski in 1951 gave two well-known upper bounds for the spectral radius of nonnega...
AbstractLet C(r)=[Cij], r=1,2,…,R, be block m×m matrices where Cij(r) are nonnegative Ni×Nj matrices...
AbstractIf a matrix A of unit norm on n-dimensional Hilbert space has eigenvalues close to zero, the...
In this paper we show new formulas for the spectral radius and the spectral subradius of a set of ma...
AbstractThe generalized spectral radius (GSR) is a fundamental concept in studying the regularity of...
Abstract: Let B2m denote the Brualdi-Li matrix,and let ρ(B2m) denote the spectral radius of Brualdi-...
AbstractLet Ψ be a bounded set of n×n nonnegative matrices in max algebra. In this paper we propose ...
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