Characterization for Rectifiable and Nonrectifiable Attractivity of Nonautonomous Systems of Linear Differential Equations

Abstract: We study a new kind of asymptotic behaviour near for the nonautonomous system of two linear differential equations: , , where the matrix-valued function has a kind of singularity at . It is called rectifiable (resp., nonrectifiable) attractivity of the zero solution, which means that as and the length of the solution curve of is finite (resp., infinite) for every . It is characterized in terms of certain asymptotic behaviour of the eigenvalues of near . Consequently, the main results are applied to a system of… Show more

Influence of nonlinearity to box-counting dimensions of spiral orbits for two-dimensional differential systems

Influence of nonlinearity to box-counting dimensions of spiral orbits for two-dimensional differential systems

Rectifiability of orbits for two-dimensional nonautonomous differential systems

Rectifiable and nonrectifiable solution curves of half-linear differential systems