Bound state basics

arXiv - PHYS - Nuclear Theory Pub Date : 2024-09-09 DOI:arxiv-2409.05660

Paul Hoyer

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Abstract

Perturbative expansions for atoms in QED are developed around interacting states, typically defined by the Schr\"odinger equation. Calculations are nevertheless done using the standard Feynman diagram expansion around free states. The classical $-\alpha/r$ potential is then obtained through an infinite sum of ladder diagrams. The complexity of this approach may have contributed to bound states being omitted from QFT textbooks, restricting the field to select experts. The confinement scale 1 fm of QCD must be introduced without changing the Lagrangian. This can be done via a boundary condition on the gauge field, which affects the bound state potential. The absence of confinement in Feynman diagrams may be due to the free field boundary condition. Poincar\'e invariance is realized dynamically for bound states, i.e., the interactions are frame dependent. Gauge theories have instantaneous interactions, due to gauge fixing at all points of space at the same time. In bound state perturbation theory each order must have exact Poincar\'e invariance. This is non-trivial even for atoms at lowest order. I summarize a perturbative approach to equal time bound states in QED and QCD, using a Fock expansion in temporal ($A^0=0$) gauge. The longitudinal electric field $E_L$ is instantaneous and need not vanish at spatial infinity for the constituents of color singlet states in QCD. Poincar\'e covariance determines the boundary condition for $E_L$ up to a universal scale, characterised by the gluon field energy density of the vacuum. A non-vanishing density contributes a linear term to the $q\bar{q}$ potential, while $qqq,\ q\bar{q}g$ and $gg$ color singlet states get analogous confining potentials.

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绑定状态基础知识

原子在 QED 中的惯性展开是围绕相互作用态展开的，通常由 Schr\"odinger 方程定义。尽管如此，计算仍使用围绕自由态的标准费曼图展开。经典的 $-\alpha/r$ 势是通过梯形图的无限和得到的。这种方法的复杂性可能导致束缚态在 QFT 教科书中被省略，使这一领域仅限于部分专家。必须在不改变拉格朗日的情况下引入 QCD 的约束尺度 1 fm。这可以通过影响束缚态势的轨距场边界条件来实现。自由场边界条件可能会导致费曼迪格图中没有约束。对于束缚态，Poincar\'e 不变性是动态实现的，也就是说，相互作用与框架有关。量规理论具有瞬时相互作用，这是由于量规同时固定在空间的所有点上。入射态扰动理论的每个阶都必须具有精确的Poincar/'einvariance。即使对于最低阶的原子来说，这也是非难的。我总结了 QED 和 QCD 中等时间束缚态的扰动方法，使用的是时间（$A^0=0$）规的福克展开。纵向电场$E_L$是瞬时的，对于QCD中彩色单子态的成分来说，它不需要在空间无穷大时消失。Poincar\'e协变决定了E_L$的边界条件，它达到了一个普遍尺度，以真空的胶子场能量密度为特征。非万向密度为$q\bar{q}$势贡献了一个线性项，而$qqq, \qq\bar{q}g$和$gg$彩色单子态则得到了类似的约束势。

本文章由计算机程序翻译，如有差异，请以英文原文为准。

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arXiv - PHYS - Nuclear Theory

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