On optimally scaled systems for second-order scalar singularly perturbed problems

We study an equivalent form of the Dirichlet problem for a quasilinear singularly perturbed second order system, which is a singular singularly perturbed boundary value problem. In this way, we have not only eliminated the usual assumption of the existence of a vector potential function, but also pr

In this paper, we study the ''multi-layer'' phenomenon of the Dirichlet problem for a singular singularly perturbed second order vector system dz 2 rdt 2 s Ž . Ž . F z, t dzrdt q g z, t under the key assumption that the corresponding reduced system is a differential algebraic system of index 1. The

We apply the new algorithm developed by Mika and Palczewski for singularly perturbed systearm of ordinary differential equ~tiom to systems of second order equations closely related to a discretised version of the telegraph equation.