Further results on the synthesis of finite-time stable systems

The logarithm of the square of the Euclidean norm is proposed as a Lyapunov function for synthesis of control systems which are finite-time stable. In some cases this appears to be a more useful Lyapunov function than the square of the Euclidean norm, since the inequalities resulting from use of a logarithmic Lyapunov function are typical of those which occur in classical stability theory. Thus, intuition developed in design of asymptotically stable systems is directly applicable to the design of finite-time stable systems. Also, in some cases the logarithmic Lyapunov function will provide a wider range of parameter values for which it is known that one has finite-time stability.

[1]  L. Weiss,et al.  ON THE STABILITY OF SYSTEMS DEFINED OVER A FINITE TIME INTERVAL. , 1965, Proceedings of the National Academy of Sciences of the United States of America.

[2]  Lawrence P. Grayson,et al.  The status of synthesis using Lyapunov's method , 1965, Autom..

[3]  P. Dorato,et al.  Finite time stability under perturbing forces and on product spaces , 1967, IEEE Transactions on Automatic Control.

[4]  L. Weiss Converse Theorems for Finite Time Stability , 1968 .

[5]  J. Heinen,et al.  Further results concerning finite-time stability , 1969 .