Linear Fringe Field Effects of Quadrupoles

TL;DR

This paper derives a more accurate analytical model for quadrupole fringe fields using Lie algebra, improving beam dynamics simulations in storage rings and high-intensity accelerators.

Contribution

It introduces a new analytical expression for quadrupole fringe effects and an equivalent hard-edge model with parameters derived analytically.

Findings

The new model shows improved accuracy over existing linear fringe models.

The equivalent hard-edge model simplifies calculations and adapts easily to changing strengths.

Numerical validation confirms the model's high accuracy.

Abstract

Fringe field becomes important when one requires more accurate modeling of a ring lattice to study the long-term beam dynamics in storage rings and deal with large aperture magnets in high-intensity proton synchrotrons or accumulator rings. In this paper, a simple expression to calculate the tune shifts due to quadrupole fringe fields is derived by using Lie algebra technique. With higher-order terms included, this method is more accurate compared with the linear fringe field model used in SAD code. The method is also applied to a BEPCII lattice. Also based on the Lie algebra technique and an inverse series technique, an equivalent hard-edge model for quadrupoles is proposed, in which the model parameters are derived analytically. The model has the advantages of the direct calculation of the equivalent length and strength of a quadrupole and the easy adaptation when the strength changes. The validity of the model and its simplified version has been checked with a numerical method, and they show very good agreements.