JIPAM - Journal of Inequalities in Pure and Applied Mathematics

This article is concerned with the infimum $e_{1}$ of the spectrum of the Schrödinger operator in $mathbf{R}^{N}$ , . It is assumed that $q_{_{-}}=max(0,-q)in L^{p}(mathbf{R}^{N})$ , where if , if The infimum $e_{1}$ is estimated in terms of the $L^{p}$ -norm of $q_{_{-}}$ and the infimum $lambda_{N,theta}$ of a functional $Lambda_{N,theta}(nu)=Vertnabla vVert_{2}^{theta}Vert vVert _{2}^{1-theta}Vert vVert_{r}^{-1},$ with element of the Sobolev space $H^{1}(mathbf{R}^{N})$ , where and . The result is optimal. The constant $lambda_{N,theta}$ is known explicitly for ; for , it is estimated by the optimal constant $C_{N,s}$ in the Sobolev inequality, where . A combination of these results gives an explicit lower bound for the infimum $e_{1}$ of the spectrum. The results improve and generalize those of Thirring [A Course in Mathematical Physics III. Quantum Mechanics of Atoms and Molecules, Springer, New York 1981] and Rosen [Phys. Rev. Lett., 49 (1982), 1885-1887] who considered the special case The infimum $lambda_{N,theta}$ of the functional $Lambda_{N,theta}$ is calculated numerically (for and ) and compared with the lower bounds as found in this article. Also, the results are compared with these by Nasibov [Soviet. Math. Dokl., 40 (1990), 110-115].

	Download Screen PDF
	Download Print PDF
	Send this article to a friend
	Print this page


search	[advanced search]		copyright 2003 terms and conditions	login