Add to ORKGIn this paper the eigenfunction expansions of the Schrödinger operator with the potential having singularity at one point are considered. The uniform estimations for the spectral function of the Schrödinger operator in closed domain are obtained. The almost everywhere convergence of the eigenfunction expansions by Riesz means in the classes Lp classes is proven by estimating the maximal operator in L1 and L2 and applying the interpolation theorem for the family of linear operators
We consider Schrödinger operators H = −1/2 Δ + V for a large class of potentials. V. We show that if...
AbstractWe consider Schrödinger operators H = − 12Δ + V for a large class of potentials. V. We show ...
Many problems of mathematical physics can be solved by separation methods of partial differential eq...
In this work, spectral expansions of the Schrödinger operator −Δ+q(y1,y2) with the singular potentia...
In this work uniformly convergent problems of the eigenfunction expansions of the Schrödinger operat...
In this work uniformly convergent problems of the eigenfunction expansions of the SchrÄodinger oper...
Present paper is devoted to study of uniformly convergence of spectral expansions in a closed domain...
Present paper is devoted to study of uniformly convergence of spectral expansions in a closed domain...
Present paper is devoted to study of uniformly convergence of spectral expansions in a closed domain...
We study sufficient conditions for uniform convergence of eigenfunction expansions associated with S...
We study sufficient conditions for uniform convergence of eigenfunction expansions associated with S...
In the present research we investigate the problems concerning the almost everywhere convergence of ...
This research focuses on convergence and summability problems of the eigenfunctions expansions of di...
In the present research we investigate the problems concerning the almost everywhere convergence of ...
We consider Schrödinger operators H = −1/2 Δ + V for a large class of potentials. V. We show that if...
We consider Schrödinger operators H = −1/2 Δ + V for a large class of potentials. V. We show that if...
AbstractWe consider Schrödinger operators H = − 12Δ + V for a large class of potentials. V. We show ...
Many problems of mathematical physics can be solved by separation methods of partial differential eq...
In this work, spectral expansions of the Schrödinger operator −Δ+q(y1,y2) with the singular potentia...
In this work uniformly convergent problems of the eigenfunction expansions of the Schrödinger operat...
In this work uniformly convergent problems of the eigenfunction expansions of the SchrÄodinger oper...
Present paper is devoted to study of uniformly convergence of spectral expansions in a closed domain...
Present paper is devoted to study of uniformly convergence of spectral expansions in a closed domain...
Present paper is devoted to study of uniformly convergence of spectral expansions in a closed domain...
We study sufficient conditions for uniform convergence of eigenfunction expansions associated with S...
We study sufficient conditions for uniform convergence of eigenfunction expansions associated with S...
In the present research we investigate the problems concerning the almost everywhere convergence of ...
This research focuses on convergence and summability problems of the eigenfunctions expansions of di...
In the present research we investigate the problems concerning the almost everywhere convergence of ...
We consider Schrödinger operators H = −1/2 Δ + V for a large class of potentials. V. We show that if...
We consider Schrödinger operators H = −1/2 Δ + V for a large class of potentials. V. We show that if...
AbstractWe consider Schrödinger operators H = − 12Δ + V for a large class of potentials. V. We show ...
Many problems of mathematical physics can be solved by separation methods of partial differential eq...