Boundary and angular layer behavior in singularly perturbed semilinear systems (Q1065241)

The authors consider the semilinear boundary value problem in the form \[ \varepsilon^2 y'' = h(t,y),\quad y(a,\varepsilon) = A, \quad y(b,\varepsilon) = B \tag{*}\] where \(y\), \(h\), \(A\) and \(B\) are \(n\)-vectors and \(\varepsilon >0\) is a small real valued parameter. It is shown that under appropriate conditions, there exist solutions of (*) which exhibit boundary layer and corner layer behaviour for all sufficiently small \(\varepsilon\).