# Optimal Hardy inequalities for Schrödinger operators on graphs

#### Autoren: Keller, Matthias; Pinchover, Yehuda; Pogorzelski, Felix (2018)

For a given subcritical discrete Schr\"odinger operator $H$ on a  weighted infinite graph $X$, we construct a Hardy-weight $w$ which is {\em optimal} in the following sense. The operator $H - \lambda w$ is subcritical in $X$ for all $\lambda < 1$, null-critical in $X$ for $\lambda = 1$, and supercritical near any neighborhood of infinity in $X$ for any $\lambda > 1$.  Our results rely on a criticality theory for Schr\"odinger operators on general weighted graphs.

Zeitschrift:
Comm. Math. Phys.
Seiten:
767–790
Band:
358

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