# Tunneling for a class of Difference Operators: Complete Asymptotics

**Authors:** Markus Klein, Elke Rosenberger

arXiv: 1706.06315 · 2018-11-14

## TL;DR

This paper provides detailed asymptotic analysis of eigenvalue splitting due to tunneling in a class of discrete difference operators with multi-well potentials, extending classical Schrödinger results to a discrete setting.

## Contribution

It derives complete asymptotic expansions for tunneling eigenvalues in discrete difference operators, considering complex geodesic configurations, using pseudodifferential techniques.

## Key findings

- Asymptotic expansions match classical Schrödinger results.
- Handles multi-geodesic and single-geodesic cases.
- Extends tunneling analysis to discrete operators.

## Abstract

We analyze a general class of difference operators $H_\varepsilon = T_\varepsilon + V_\varepsilon$ on $\ell^2(\varepsilon\mathbf{Z}^d)$, where $V_\varepsilon$ is a multi-well potential and $\varepsilon$ is a small parameter. We derive full asymptotic expansions of the prefactor of the exponentially small eigenvalue splitting due to interactions between two "wells" (minima) of the potential energy, i.e., for the discrete tunneling effect. We treat both the case where there is a single minimal geodesic (with respect to the natural Finsler metric induced by the leading symbol $h_0(x,\xi)$ of $H_\varepsilon$) connecting the two minima and the case where the minimal geodesics form an $\ell+1$ dimensional manifold, $\ell\geq 1$. These results on the tunneling problem are as sharp as the classical results for the Schr\"odinger operator in \cite{hesjo}. Technically, our approach is pseudodifferential and we adapt techniques from \cite{hesjo2} and \cite{hepar} to our discrete setting.

## Full text

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## Figures

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## References

31 references — full list in the complete paper: https://tomesphere.com/paper/1706.06315/full.md

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Source: https://tomesphere.com/paper/1706.06315