# $L^{p}-L^{p^{\prime}}$ estimates for matrix Schr\"{o}dinger equations

**Authors:** Ivan Naumkin, Ricardo Weder

arXiv: 1906.07846 · 2021-08-31

## TL;DR

This paper establishes $L^{p}-L^{p^{	inyprime}}$ dispersive estimates for matrix Schr"odinger equations on the line and half-line, including boundary conditions, and applies these to derive Strichartz estimates for such systems.

## Contribution

It provides new $L^{p}-L^{p^{	inyprime}}$ estimates for matrix Schr"odinger equations with general boundary conditions, extending previous results to more general potentials and boundary scenarios.

## Key findings

- Proved $L^{p}-L^{p^{	inyprime}}$ estimates for matrix Schr"odinger equations on the half-line.
- Extended $L^{p}-L^{p^{	inyprime}}$ estimates to systems on the line using half-line results.
- Derived Strichartz estimates from the established dispersive bounds.

## Abstract

This paper is devoted to the study of dispersive estimates for matrix Schr\"odinger equations on the half-line with general boundary condition, and on the line. We prove $L^{p}-L^{p^{\prime}}$ estimates on the half-line for slowly decaying selfadjoint matrix potentials that satisfy $\int_{0}^{\infty }\, (1+x) |V(x)|\, dx < \infty$ both in the generic and in the exceptional cases. We obtain our $L^{p}-L^{p^{\prime}}$ estimate on the line for a $n \times n$ system, under the condition that $\int_{-^{\infty}}^{\infty}\, (1+|x|)\, |V(x)|\, dx < \infty,$ from the $L^{p}-L^{p^{\prime}}$ estimate for a $2n\times2n$ system on the half-line. With our $L^{p}-L^{p^{\prime}}$ estimates we prove Strichartz estimates.

## Full text

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## References

45 references — full list in the complete paper: https://tomesphere.com/paper/1906.07846/full.md

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Source: https://tomesphere.com/paper/1906.07846