The nonlocal boundary value problem with perturbations of mixed boundary conditions for an elliptic equation with constant coefficients. I
https://doi.org/10.15330/cmp.11.2.228-239
Keywords:
differential equation with partial derivatives, eigenfunctions, Riesz basisAbstract
In this article we investigate a problem with nonlocal boundary conditions which are multipoint perturbations of mixed boundary conditions in the unit square GG using the Fourier method. The properties of a generalized transformation operator R:L2(G)→L2(G)R:L2(G)→L2(G) that reflects normalized eigenfunctions of the operator L0L0 of the problem with mixed boundary conditions in the eigenfunctions of the operator LL for nonlocal problem with perturbations, are studied. We construct a system V(L)V(L) of eigenfunctions of operator L.L. Also, we define conditions under which the system V(L)V(L) is total and minimal in the space L2(G),L2(G), and conditions under which it is a Riesz basis in the space L2(G).L2(G). In the case if V(L)V(L) is a Riesz basis in L2(G),L2(G), we obtain sufficient conditions under which nonlocal problem has a unique solution in form of Fourier series by system V(L).V(L).
