In this paper we study boundary value problems for pencils of differential operators depending polynomially on a parameter λ. The symbols of these pencils for large values of the parameter admit a two-sided estimate formulated in terms of the Newton polygon. We formulate an analog of the Agmon-Agranovich-Vishik condition, which guarantees the existence of the inverse operator in special parameter-depended norms for large λ. For simplicity we consider only the case of operators with constant coefficients in the half-space. The case of operators with variable coefficients on a manifold with boundary will be treated separately.

Mathematical problems and theory of numerical methods

Volevich L. R.,  KIAM RAS

Denk R.