DOIAbstract
AbstractIn this paper we characterize all nxn matrices whose spectral radius equals their spectral norm. We show that for n⩾3 the class of these matrices contains the normal matrices as a subclass
AbstractIn this paper we characterize all nxn matrices whose spectral radius equals their spectral norm. We show that for n⩾3 the class of these matrices contains the normal matrices as a subclass
The spectral p-norm of r-matrices generalizes the spectral 2-norm of 2-matrices. In 1911 Schur gave ...
AbstractIn this work, we find a necessary and sufficient condition for the normality of an h-hyperto...
AbstractWe consider the minimum spectral radius for an n × n matrix of 0's and 1's having a specifie...
AbstractIn this paper we characterize all nxn matrices whose spectral radius equals their spectral n...
AbstractLet Mn+ be the set of entrywise nonnegative n×n matrices. Denote by r(A) the spectral radius...
Let Mn(R) be the linear space of all n×n matrices over the real field R. For any AMn(R), let ρ(A) an...
AbstractFor an arbitrary asymmetric nonnegative n × n matrix A we identify a pair of symmetric matri...
AbstractLet Mn(R) be the linear space of all n×n matrices over the real field R. For any A∈Mn(R), le...
AbstractLet A be a complex n×n matrix, θ a matricial norm and r(A) the spectral radius of A. Then, i...
AbstractIf a matrix A of unit norm on n-dimensional Hilbert space has eigenvalues close to zero, the...
AbstractThe generalized spectral radius, also known under the name of joint spectral radius, or (aft...
AbstractA generalized matrix norm G dominates the spectral radius for all AϵMn(C) (i) if for some po...
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 ...
AbstractKy Fan defines an N-matrix to be a matrix of the form A = tI − B, B ⩾ 0, λ < t < ϱ(B), where...
The spectral p-norm of r-matrices generalizes the spectral 2-norm of 2-matrices. In 1911 Schur gave ...
AbstractIn this work, we find a necessary and sufficient condition for the normality of an h-hyperto...
AbstractWe consider the minimum spectral radius for an n × n matrix of 0's and 1's having a specifie...
AbstractIn this paper we characterize all nxn matrices whose spectral radius equals their spectral n...
AbstractLet Mn+ be the set of entrywise nonnegative n×n matrices. Denote by r(A) the spectral radius...
Let Mn(R) be the linear space of all n×n matrices over the real field R. For any AMn(R), let ρ(A) an...
AbstractFor an arbitrary asymmetric nonnegative n × n matrix A we identify a pair of symmetric matri...
AbstractLet Mn(R) be the linear space of all n×n matrices over the real field R. For any A∈Mn(R), le...
AbstractLet A be a complex n×n matrix, θ a matricial norm and r(A) the spectral radius of A. Then, i...
AbstractIf a matrix A of unit norm on n-dimensional Hilbert space has eigenvalues close to zero, the...
AbstractThe generalized spectral radius, also known under the name of joint spectral radius, or (aft...
AbstractA generalized matrix norm G dominates the spectral radius for all AϵMn(C) (i) if for some po...
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 ...
AbstractKy Fan defines an N-matrix to be a matrix of the form A = tI − B, B ⩾ 0, λ < t < ϱ(B), where...
The spectral p-norm of r-matrices generalizes the spectral 2-norm of 2-matrices. In 1911 Schur gave ...
AbstractIn this work, we find a necessary and sufficient condition for the normality of an h-hyperto...
AbstractWe consider the minimum spectral radius for an n × n matrix of 0's and 1's having a specifie...
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