Abstract:
We study the asymptotics of solutions to the Dirichlet problem in a domain
$\mathcal{X}
\subset \mathbb{R}^3$
whose
boundary contains a singular point
$O$.
In a small neighborhood of this point, the domain has the form
$\{ z > \sqrt{x^2 + y^4}
\}$,
i.e., the origin is a nonsymmetric conical point at the boundary.
So far, the behavior of solutions to elliptic boundary-value problems has not been studied sufficiently
in the case of nonsymmetric singular points.
This problem was posed by V.A. Kondrat'ev in 2000.
We establish a complete asymptotic expansion of solutions near the singular point.
