Lyapunov regularity of linear differential algebraic equations of index 1
---Publisher, magazine: ,
Publication year: 2004
Lưu Trích dẫn Chia sẻAbstract
In this paper, we introduce a concept of Lyapunov regularity of linear differential algebraic equations (DAEs) based on the notion of Lyapunov exponents of DAEs. It was proved that under certain conditions a DAE of index 1 is Lyapunov regular if and only if the corresponding ordinary differential equation is Lyapunov regular.
Tags: None
Các bài viết liên quan đến tác giả Nguyễn Đình Công
Lyapunov regularity of linear differential algebraic equations of index 1
Almost all nonautonomous linear stochastic differential equations are regular
A remark on non-uniform property of linear cocycles
A generic bounded linear cocycle has simple Lyapunov spectrum
The essential range of a nonabelian cocycle is not a cohomology invariant
An open set of unbounded cocycles with simple Lyapunov spectrum and no exponential separation
Lyapunov's inequality for linear differential algebraic equation
Dichotomy spectrum of nonautonomous linear stochastic differential equations
Generic properties of Lyapunov exponents
Lyapunov spectrum of nonautonomous linear stochastic differential equations