Asymptotic behavior of the solution of a small-parameter equation in a domain with a conical point on the boundary (Q416919)

In a bounded domain \(D\subset {\mathbb R}^3\) with a boundary \(\Gamma\), define \(L_0\) and \(L_{\varepsilon}\) by \(L_0u = u_{zz} +b(x_1, x_2, z)u_z + a(x_1, x_2, z)u\) and \(L_{\varepsilon}u = \varepsilon(u_{x_1x_1}+u_{x_2x_2}) + L_0u\). In this paper, the Dirichlet boundary value problem \(L_{\varepsilon}u=f(x_1, x_2, z)\) for \((x_1, x_2, z)\in D\) with \(u(x_1, x_2, z) = 0\) for \((x_1, x_2, z)\in \Gamma\) is considered, where \(\varepsilon>0\) is a parameter and \(\Gamma\) contains a conical point \(M_0\). Asymptotic expansion of the solution is constructed and the behavior of the solution as \(\varepsilon\to 0\) is analysed. This is the continuation of the author's previous work.