English

A Schwartz-type boundary value problem in a biharmonic plane

Analysis of PDEs 2016-10-04 v1

Abstract

A commutative algebra B\mathbb{B} over the field of complex numbers with the bases {e1,e2}\{e_1,e_2\} satisfying the conditions (e12+e22)2=0(e_1^2+e_2^2)^2=0, e12+e220e_1^2+e_2^2\ne 0, is considered. The algebra B\mathbb{B} is associated with the biharmonic equation. Consider a Schwartz-type boundary value problem on finding a monogenic function of the type Φ(xe1+ye2)=U1(x,y)e1+U2(x,y)ie1+U3(x,y)e2+U4(x,y)ie2\Phi(xe_1+ye_2)=U_{1}(x,y)\,e_1+U_{2}(x,y)\,ie_1+ U_{3}(x,y)\,e_2+U_{4}(x,y)\,ie_2, (x,y)D(x,y)\in D, when values of two components U1U_1, U4U_4 are given on the boundary of a domain DD lying in the Cartesian plane xOyxOy. We develop a method of its solving which is based on expressions of monogenic functions via corresponding analytic functions of the complex variable. For a half-plane and for a disk, solutions are obtained in explicit forms by means of Schwartz-type integrals.

Keywords

Cite

@article{arxiv.1610.00436,
  title  = {A Schwartz-type boundary value problem in a biharmonic plane},
  author = {S. V. Gryshchuk and S. A. Plaksa},
  journal= {arXiv preprint arXiv:1610.00436},
  year   = {2016}
}
R2 v1 2026-06-22T16:08:28.705Z