# Integral kernels of Schr\"odinger semigroups with nonnegative locally   bounded potentials

**Authors:** Mi{\l}osz Baraniewicz, Kamil Kaleta

arXiv: 2302.13886 · 2023-03-13

## TL;DR

This paper provides sharp upper and lower estimates for heat kernels of Schr"odinger operators with nonnegative, locally bounded potentials, revealing how the potential influences the kernel and spectral properties.

## Contribution

It introduces a new approach to estimate Schr"odinger heat kernels, separating potential effects per variable and analyzing their interplay with the Gaussian kernel.

## Key findings

- Sharp two-sided heat kernel estimates for Schr"odinger operators.
- Identification of exponential decay rates related to the spectrum.
- Analysis of large-time behavior of non-intrinsically ultracontractive semigroups.

## Abstract

We give the upper and the lower estimates of heat kernels for Schr\"odinger operators $H=-\Delta+V$, with nonnegative and locally bounded potentials $V$ in $\mathbb{R}^d$, $d \geq 1$. We observe a factorization: the contribution of the potential is described separately for each spatial variable, and the interplay between the spatial variables is seen only through the Gaussian kernel - optimal in the lower bound and nearly optimal in the upper bound. In some regimes we observe the exponential decay in time with the rate corresponding to the bottom of the spectrum of $H$. Our estimates identify in a fairly informative and uniform way the dependence of the potential $V$ and the dimension $d$. The upper estimate is more local; it applies to general potentials, including confining and decaying ones, even if they are non-radial, and mixtures. The lower bound is specialized to confining case, and the contribution of the potential is described in terms of its radial upper profile. Our results take the sharpest form for confining potentials that are comparable to radial monotone profiles with sufficiently regular growth - in this case they lead to two-sided qualitatively sharp estimates. In particular, we describe the large-time behaviour of nonintrinsically ultracontractive Schr\"odinger semigroups - this problem was open for a long time. The methods we use combine probabilistic techniques with analytic ideas. We propose a new effective approach which leads us to short and direct proofs.

## Full text

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## References

32 references — full list in the complete paper: https://tomesphere.com/paper/2302.13886/full.md

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Source: https://tomesphere.com/paper/2302.13886