On the hot spots of quantum graphs

Abstract: We undertake a systematic investigation of the maxima and minima of the eigenfunctions associated with the first nontrivial eigenvalue of the Laplacian on a metric graph equipped with standard (continuity-Kirchhoff) vertex conditions. This is inspired by the famous hot spots conjecture for the Laplacian on a Euclidean domain, and the points on the graph where maxima and minima are achieved represent the generically "hottest" and "coldest" spots of the graph. We prove results on both the number and location of … Show more

“…Many properties of the non-trivial behavior of Schrödinger operators on metric graphs can be investigated in terms of spectral theory, which has been studied in recent years in various perspectives such as spectral estimates, properties of eigenfunctions, inverse problems or questions of isospectrality, see [1,2,9,12,14,18,22,23,24,34,35,39,40,52,57,58,60,61] for a few of the most recent developments.…”

Spectral Monotonicity for Schrödinger Operators on Metric Graphs

“…Many properties of the non-trivial behavior of Schrödinger operators on metric graphs can be investigated in terms of spectral theory, which has been studied in recent years in various perspectives such as spectral estimates, properties of eigenfunctions, inverse problems or questions of isospectrality, see [1,2,9,12,14,18,22,23,24,34,35,39,40,52,57,58,60,61] for a few of the most recent developments.…”

Spectral Monotonicity for Schrödinger Operators on Metric Graphs

Sturm-Liouville problems and global bounds by small control sets and applications to quantum graphs