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Lyapunov equation
"... The following conjecture relates the eigenvalues of certain matrices that are derived from the solution of a Lyapunov equation that occurred in the analysis of stochastic subspace identification algorithms [3]. First, we formulate the conjecture as a pure matrix algebraic problem. In Section 2, we w ..."
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The following conjecture relates the eigenvalues of certain matrices that are derived from the solution of a Lyapunov equation that occurred in the analysis of stochastic subspace identification algorithms [3]. First, we formulate the conjecture as a pure matrix algebraic problem. In Section 2, we
ON THE ESTIMATION OF UPPER BOUND FOR SOLUTIONS OF PERTURBED DISCRETE LYAPUNOV EQUATIONS
, 2006
"... The estimation of the positive definite solutions to perturbed discrete Lyapunov equations is discussed. Several upper bounds of the positive definite solutions are obtained when the perturbation parameters are normbounded uncertain. In the derivation of the bounds, one only needs to deal with eige ..."
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The estimation of the positive definite solutions to perturbed discrete Lyapunov equations is discussed. Several upper bounds of the positive definite solutions are obtained when the perturbation parameters are normbounded uncertain. In the derivation of the bounds, one only needs to deal
LYAPUNOV FUNCTIONALS FOR THE ENSKOG EQUATION
, 2006
"... Abstract. Two Lyapunov functionals are presented for the Enskog equation. One is to describe interactions between particles with various velocities and another is to measure the L 1 distance between two classical solutions. The former yields the timeasymptotic convergence of global classical soluti ..."
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Abstract. Two Lyapunov functionals are presented for the Enskog equation. One is to describe interactions between particles with various velocities and another is to measure the L 1 distance between two classical solutions. The former yields the timeasymptotic convergence of global classical
EFFICIENT LOWRANK SOLUTIONS OF GENERALIZED LYAPUNOV EQUATIONS∗
, 2014
"... Abstract. An iterative method for the lowrank approximate solution of a class of generalized Lyapunov equations is studied. At each iteration, a standard Lyapunov equation is solved using Galerkin projection with an extended Krylov subspace method. This Lyapunov equation is solved inexactly, thus p ..."
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Abstract. An iterative method for the lowrank approximate solution of a class of generalized Lyapunov equations is studied. At each iteration, a standard Lyapunov equation is solved using Galerkin projection with an extended Krylov subspace method. This Lyapunov equation is solved inexactly, thus
Equations.
, 1996
"... A Mixed Variational Formulation for 3D Magnetostatics and its Finite Element February 1996 ..."
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A Mixed Variational Formulation for 3D Magnetostatics and its Finite Element February 1996
Differential equations in metric spaces with applications. Discrete Contin
 Dyn. Syst
"... This paper proves the local well posedness of differential equations in metric spaces under assumptions that allow to comprise several different applications. We consider below a system of balance laws with a dissipative non local source, the HilleYosida Theorem, a generalization of a recent resu ..."
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Cited by 9 (5 self)
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This paper proves the local well posedness of differential equations in metric spaces under assumptions that allow to comprise several different applications. We consider below a system of balance laws with a dissipative non local source, the HilleYosida Theorem, a generalization of a recent
Results 1  10
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662,654