@article{Baranetskij_Kalenyuk_Kopach_Solomko_2020, title={The nonlocal multipoint problem with Dirichlet-type conditions for an ordinary differential equation of even order with involution}, volume={54}, url={http://matstud.org.ua/ojs/index.php/matstud/article/view/31}, DOI={10.30970/ms.54.1.64-78}, abstractNote={<p>The spectral properties of the nonself-adjoint problem with multipoint perturbations of the Dirichlet conditions for differential operator of order $2n$ with involution are investigated. The system of eigenfunctions of a multipoint problem is constructed. Sufficient conditions have been established, under which this system is complete and, under some additional assumptions, forms the Riesz basis. The research is structured as follows. In section 2 we investigate the properties of the Sturm-type conditions and nonlocal problem with self-adjoint boundary conditions for the equation $$(-1)^ny^{(2n)}(x)+ a_{0}y^{(2n-1)}(x)+ a_{1}y^{(2n-1)}(1-x)=f(x),\,x\in (0,1).$$ In section 3 we study the spectral properties for nonlocal problem with nonself-adjoint boundary conditions for this equation. In sections 4 we construct a commutative group of transformation operators. Using spectral properties of multipoint problem and conditions for completeness the basis properties of the systems of eigenfunctions are established in section 5. In section 6 some analogous results are obtained for multipoint problems generated by differential equations with an involution and are proved the main theorems.</p>}, number={1}, journal={Matematychni Studii}, author={Baranetskij, Ya.O. and Kalenyuk, P.I. and Kopach, M. I. and Solomko, A.V.}, year={2020}, month={Oct.}, pages={64-78} }