On the eigenvalue counting function for Schr\"odinger operator: some   upper bounds

Fabio E.G. Cipriani

arXiv:1909.02731·math-ph·October 18, 2019

On the eigenvalue counting function for Schr\"odinger operator: some upper bounds

Fabio E.G. Cipriani

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Abstract

The aim of this work is to provide an upper bound on the eigenvalues counting function $N (R^{n}, - Δ + V, e)$ of a Sch\"odinger operator $- Δ + V$ on $R^{n}$ corresponding to a potential $V \in L^{\frac{n}{2} + ε} (R^{n}, d x)$ , in terms of the sum of the eigenvalues counting function of the Dirichlet integral $D$ with Dirichlet boundary conditions on the subpotential domain ${V < e}$ , endowed with weighted Lebesgue measure $(V - e)_{-} \cdot d x$ and the eigenvalues counting function of the absorption-to-reflection operator on the equipotential surface ${V = e}$ .

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TopicsSpectral Theory in Mathematical Physics · Graph theory and applications · advanced mathematical theories