A rapidly-converging lower bound for the joint spectral radius via multiplicative ergodic theory

Approximation of the joint spectral radius using sum of squares

Parrilo, Pablo A.
Jadbabaie, Ali

May 2008

AbstractWe provide an asymptotically tight, computationally efficient approximation of the joint spe...

Spectral radius of Hadamard product versus conventional product for non-negative matrices

Audenaert, Koenraad M.R.

January 2010

AbstractWe prove an inequality for the spectral radius of products of non-negative matrices conjectu...

Sharp upper bounds on the distance spectral radius of a graph

Chen, Yingying
Lin, Huiqiu
Shu, Jinlong

November 2013

AbstractLet M=(mij) be a nonnegative irreducible n×n matrix with diagonal entries 0. The largest eig...

A rapidly-converging lower bound for the joint spectral radius via multiplicative ergodic theory

Morris, Ian D.

December 2010

We use ergodic theory to prove a quantitative version of a theorem of M.A. Berger and Y. Wang. which...

A rapidly-converging lower bound for the joint spectral radius via multiplicative ergodic theory

Morris, Ian D.

December 2010

AbstractWe use ergodic theory to prove a quantitative version of a theorem of M.A. Berger and Y. Wan...

The generalised Berger–Wang formula and the spectral radius of linear cocycles

Morris, Ian D.

February 2012

AbstractUsing ergodic theory we prove two formulae describing the relationships between different no...

Joint spectral radius, Sturmian measures and the finiteness conjecture

Jenkinson, Oliver
Pollicott, Mark

December 2018

The joint spectral radius of a pair of 2×2 real matrices (A0,A1)∈M2(R)2(A0,A1)∈M2(R)2 is defined to ...

Computing the joint spectral radius

Gripenberg, Gustaf

February 1996

AbstractThis paper presents algorithms for finding an arbitrarily small interval that contains the j...

Characterization of joint spectral radius via trace

Chen, Quande
Zhou, Xinlong

August 2000

AbstractThe joint spectral radius for a bounded collection of the square matrices with complex entri...

Spectral quantities associated to pairs of matrices are hard, when not impossible, to compute and to approximate

January 1996

Caption title.Includes bibliographical references (p. 9-11).Supported by the ARO. DAAL-03-92-G-0115J...

The generalized spectral-radius theorem: An analytic-geometric proof

Elsner, L.

April 1995

AbstractLet ∑ be a bounded set of complex matrices,∑m = {A1 ... Am: Ai ∈ ∑}. The generalized spectra...

Finiteness property of pairs of 2×2 sign-matrices via real extremal polytope norms

Cicone, Antonio
Guglielmi, Nicola
Serra-Capizzano, Stefano
Zennaro, Marino

January 2010

AbstractThis paper deals with the joint spectral radius of a finite set of matrices. We say that a s...

An explicit counterexample to the Lagarias–Wang finiteness conjecture

Hare, Kevin G.
Morris, Ian D.
Sidorov, Nikita
Theys, Jacques

April 2011

AbstractThe joint spectral radius of a finite set of real d×d matrices is defined to be the maximum ...

Computationally efficient approximations of the joint spectral radius

Blondel, Vincent
Nesterov, Yurii

January 2005

The joint spectral radius of a set of matrices is a measure of the maximal asymptotic growth rate th...

The finiteness conjecture for the generalized spectral radius of a set of matrices

Lagarias, Jeffrey C.
Wang, Yang

January 1995

AbstractThe generalized spectral radius\̄g9(∑) of a set ∑ of n × n matrices is \̄g9(∑) = lim supk→∞\...

Approximation of the joint spectral radius using sum of squares

Parrilo, Pablo A.
Jadbabaie, Ali

May 2008

AbstractWe provide an asymptotically tight, computationally efficient approximation of the joint spe...

Spectral radius of Hadamard product versus conventional product for non-negative matrices

Audenaert, Koenraad M.R.

January 2010

AbstractWe prove an inequality for the spectral radius of products of non-negative matrices conjectu...

Sharp upper bounds on the distance spectral radius of a graph

Chen, Yingying
Lin, Huiqiu
Shu, Jinlong

November 2013

AbstractLet M=(mij) be a nonnegative irreducible n×n matrix with diagonal entries 0. The largest eig...

A rapidly-converging lower bound for the joint spectral radius via multiplicative ergodic theory

Morris, Ian D.

December 2010

We use ergodic theory to prove a quantitative version of a theorem of M.A. Berger and Y. Wang. which...

A rapidly-converging lower bound for the joint spectral radius via multiplicative ergodic theory

Morris, Ian D.

December 2010

AbstractWe use ergodic theory to prove a quantitative version of a theorem of M.A. Berger and Y. Wan...

The generalised Berger–Wang formula and the spectral radius of linear cocycles

Morris, Ian D.

February 2012

AbstractUsing ergodic theory we prove two formulae describing the relationships between different no...

Joint spectral radius, Sturmian measures and the finiteness conjecture

Jenkinson, Oliver
Pollicott, Mark

December 2018

The joint spectral radius of a pair of 2×2 real matrices (A0,A1)∈M2(R)2(A0,A1)∈M2(R)2 is defined to ...

Computing the joint spectral radius

Gripenberg, Gustaf

February 1996

AbstractThis paper presents algorithms for finding an arbitrarily small interval that contains the j...

Characterization of joint spectral radius via trace

Chen, Quande
Zhou, Xinlong

August 2000

AbstractThe joint spectral radius for a bounded collection of the square matrices with complex entri...

Spectral quantities associated to pairs of matrices are hard, when not impossible, to compute and to approximate

January 1996

Caption title.Includes bibliographical references (p. 9-11).Supported by the ARO. DAAL-03-92-G-0115J...

The generalized spectral-radius theorem: An analytic-geometric proof

Elsner, L.

April 1995

AbstractLet ∑ be a bounded set of complex matrices,∑m = {A1 ... Am: Ai ∈ ∑}. The generalized spectra...

Finiteness property of pairs of 2×2 sign-matrices via real extremal polytope norms

Cicone, Antonio
Guglielmi, Nicola
Serra-Capizzano, Stefano
Zennaro, Marino

January 2010

AbstractThis paper deals with the joint spectral radius of a finite set of matrices. We say that a s...

An explicit counterexample to the Lagarias–Wang finiteness conjecture

Hare, Kevin G.
Morris, Ian D.
Sidorov, Nikita
Theys, Jacques

April 2011

AbstractThe joint spectral radius of a finite set of real d×d matrices is defined to be the maximum ...

Computationally efficient approximations of the joint spectral radius

Blondel, Vincent
Nesterov, Yurii

January 2005

The joint spectral radius of a set of matrices is a measure of the maximal asymptotic growth rate th...

The finiteness conjecture for the generalized spectral radius of a set of matrices

Lagarias, Jeffrey C.
Wang, Yang

January 1995

AbstractThe generalized spectral radius\̄g9(∑) of a set ∑ of n × n matrices is \̄g9(∑) = lim supk→∞\...

Approximation of the joint spectral radius using sum of squares

Parrilo, Pablo A.
Jadbabaie, Ali

May 2008

AbstractWe provide an asymptotically tight, computationally efficient approximation of the joint spe...

Spectral radius of Hadamard product versus conventional product for non-negative matrices

Audenaert, Koenraad M.R.

January 2010

AbstractWe prove an inequality for the spectral radius of products of non-negative matrices conjectu...

Sharp upper bounds on the distance spectral radius of a graph

Chen, Yingying
Lin, Huiqiu
Shu, Jinlong

November 2013

AbstractLet M=(mij) be a nonnegative irreducible n×n matrix with diagonal entries 0. The largest eig...

A rapidly-converging lower bound for the joint spectral radius via multiplicative ergodic theory

Abstract

Extracted data

A rapidly-converging lower bound for the joint spectral radius via multiplicative ergodic theory

Abstract

Extracted data

Related items

Related items