Add to ORKGAbstract. We present a short and simple proof of the well-known Cauchy interlace theo-rem. We use the theorem to improve some lower bound estimates for the spectral radius of a real symmetric matrix
AbstractWe use ergodic theory to prove a quantitative version of a theorem of M.A. Berger and Y. Wan...
We use ergodic theory to prove a quantitative version of a theorem of M.A. Berger and Y. Wang. which...
AbstractWe develop lower bounds for the spectral radius of symmetric, skew-symmetric, and arbitrary ...
Abstract. We present a short and simple proof of the well-known Cauchy interlace theo-rem. We use th...
We present a short and simple proof of the well-known Cauchy interlace theorem. We use the theorem t...
AbstractWe develop lower bounds for the spectral radius of symmetric, skew-symmetric, and arbitrary ...
Let A be an n x n matrix with eigenvalues lambda(1),lambda 2,...,lambda(n), and let m be an integer ...
The lower spectral radius of a set of d d matrices is de ned to be the minimum possible exponential ...
The lower spectral radius of a set of d d matrices is de ned to be the minimum possible exponential ...
© 2014 London Mathematical Society.The lower spectral radius, or joint spectral subradius, of a set ...
In this paper we show new formulas for the spectral radius and the spectral subradius of a set of ma...
summary:We obtain a sharp upper bound for the spectral radius of a nonnegative matrix. This result i...
Elsner L. The generalized spectral-radius theorem: An analytic-geometric proof. Linear Algebra and i...
AbstractLet A be an n×n matrix with eigenvalues λ1,λ2,…,λn, and let m be an integer satisfying rank(...
AbstractLet ∑ be a bounded set of complex matrices,∑m = {A1 ... Am: Ai ∈ ∑}. The generalized spectra...
AbstractWe use ergodic theory to prove a quantitative version of a theorem of M.A. Berger and Y. Wan...
We use ergodic theory to prove a quantitative version of a theorem of M.A. Berger and Y. Wang. which...
AbstractWe develop lower bounds for the spectral radius of symmetric, skew-symmetric, and arbitrary ...
Abstract. We present a short and simple proof of the well-known Cauchy interlace theo-rem. We use th...
We present a short and simple proof of the well-known Cauchy interlace theorem. We use the theorem t...
AbstractWe develop lower bounds for the spectral radius of symmetric, skew-symmetric, and arbitrary ...
Let A be an n x n matrix with eigenvalues lambda(1),lambda 2,...,lambda(n), and let m be an integer ...
The lower spectral radius of a set of d d matrices is de ned to be the minimum possible exponential ...
The lower spectral radius of a set of d d matrices is de ned to be the minimum possible exponential ...
© 2014 London Mathematical Society.The lower spectral radius, or joint spectral subradius, of a set ...
In this paper we show new formulas for the spectral radius and the spectral subradius of a set of ma...
summary:We obtain a sharp upper bound for the spectral radius of a nonnegative matrix. This result i...
Elsner L. The generalized spectral-radius theorem: An analytic-geometric proof. Linear Algebra and i...
AbstractLet A be an n×n matrix with eigenvalues λ1,λ2,…,λn, and let m be an integer satisfying rank(...
AbstractLet ∑ be a bounded set of complex matrices,∑m = {A1 ... Am: Ai ∈ ∑}. The generalized spectra...
AbstractWe use ergodic theory to prove a quantitative version of a theorem of M.A. Berger and Y. Wan...
We use ergodic theory to prove a quantitative version of a theorem of M.A. Berger and Y. Wang. which...
AbstractWe develop lower bounds for the spectral radius of symmetric, skew-symmetric, and arbitrary ...