Some methods for solving boundary value problems for polyharmonic equations
DOI:
https://doi.org/10.31489/2025m1/143-154Keywords:
first order elliptic system, polyharmonic equation, continuity of solution, boundary value problem, integral representations of solutionAbstract
This article consists of three sections. In the first section the concept of Vekua space is introduced, where for elliptic systems of the first order, the theorem on the representation of the solution of a homogeneous equation and the theorem on the continuity of the solution of an inhomogeneous equation are valid. In the second section the Vekua method for solving boundary value problems for a polyharmonic equation is described. In the third section the Otelbaev method describes the correct boundary value problems for a polyharmonic equation in a multidimensional sphere.
