The Neumann Problem for a Second-Order Singular System

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 study the second-order boundary value problem where a(t) = [I~=L ai (t) and a,/3,-)% 6 \_> 0, a'~ ~-a5 ÷ fi~/> 0. We assume that each ai (t) E L p~: [0, 1] for Pi ~ 1 and that each a~(t) has a singularity in (0, 1). To show the existence of countably many positive solutions, we apply HSlder's in

## Abstract A second‐order finite difference scheme for mixed boundary value problems is presented. This scheme does not require the tangential derivative of the Neumann datum. It is designed for applications in which the Neumann condition is available only in discretized form. The second‐order con

A hyperbolic mixed initial boundary-value problem is investigated in which the Neumann condition and the Dirichlet condition are given on complementary parts of the boundary. An existence and uniqueness result in Sobolev spaces with additional differentiation in the tangential directions to the inte