Stability problems for singularly perturbed systems class

## Sufficient conditions are obtained lo guarantee the asymptotic stability of a class of non-linear singularly perturbed systems. A procedure for consrructing a Lyapunov function for such a class of systems is given, and a clearly defined domain of attraction of the equilibrium is obtained. A sta

The maximal stability bound H of a linear time-invariant singularly perturbed system is derived in an explicit and closed form, such that the stability of the systems is guaranteed for 0) ( H. Two new approaches including time-and frequency-domain methods are employed to solve this problem. The form

## Abstract This work deals with the construction of difference schemes for the numerical solution of singularly perturbed boundary value problems, which appear while solving heat transfer equations with spherical symmetry. The projective version of integral interpolation (PVIIM) method is used. De

The model matching problem for single-input single-output singularly perturbed systems is considered. Two sets of sufficient conditions are obtained to guarantee the existence of a two-frequency-scale solution: one for the optimal and one for a suboptimal case. Both the minimum-phase and the non-min