# Quantum Variational Principle and quantum multiform structure: the case   of quadratic Lagrangians

**Authors:** Steven D. King, Frank W. Nijhoff

arXiv: 1702.08709 · 2017-03-16

## TL;DR

This paper introduces a quantum variational principle based on multiform path integrals, extending classical multidimensional consistency and Lagrangian multiform structures to quantum systems with quadratic Lagrangians, revealing integrable properties.

## Contribution

It proposes a novel quantum variational principle using multiform path integrals and explores its application to quadratic Lagrangians and discrete integrable systems.

## Key findings

- Quantum propagators for quadratic Lagrangians can be explicitly computed using Gaussian integrals.
- Periodic reductions lead to discrete multi-time integrable mappings like the harmonic oscillator.
- The new quantum variational principle uncovers rich integrable structures in quantum discrete systems.

## Abstract

A modern notion of integrability is that of multidimensional consistency (MDC), which classically implies the coexistence of (commuting) dynamical flows in several independent variables for one and the same dependent variable. This property holds for both continuous dynamical systems as well as for discrete ones defined in discrete space-time. Possibly the simplest example in the discrete case is that of a linear quadrilateral lattice equation, which can be viewed as a linearised version of the well-known lattice potential Korteweg-de Vries (KdV) equation. In spite of the linearity, the MDC property is non-trivial in terms of the parameters of the system. The Lagrangian aspects of such equations, and their nonlinear analogues, has led to the notion of Lagrangian multiform structures, where the Lagrangians are no longer scalar functions (or volume forms) but genuine forms in a multidimensional space of independent variables. The variational principle involves variations not only with respect to the field variables, but also with respect to the geometry in the space of independent variables. In this paper we consider a quantum analogue of this new variational principle by means of quantum propagators (or equivalently Feynman path integrals). In the case of quadratic Lagrangians these can be evaluated in terms of Gaussian integrals. We study also periodic reductions of the lattice leading to discrete multi-time dynamical commuting mappings, the simplest example of which is the discrete harmonic oscillator, which surprisingly reveals a rich integrable structure behind it. On the basis of this study we propose a new quantum variational principle in terms of multiform path integrals.

## Full text

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## Figures

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## References

50 references — full list in the complete paper: https://tomesphere.com/paper/1702.08709/full.md

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