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《中国物理C》(英文)编辑部
2024年10月30日

THE BEAM ENVELOP ANALYSIS FOR NONPERIODIC SYSTEMS

  • The beam envelops for non-periodic alternating gradient focusing system is analysed. The accurate analytic expressions of the beam envelop function β is obtained by solving the following non-linear differential equation:(√β)н+Q(Z)√β-1/(√β)3=0,
    The conditions of existing the maximum and the minimum of beam envelop are discussed. And we have derived the accurate formulae with which one can calculate the maximum and the minimum values of envelop and their position. The method developed in this paper is different from the convintional matrix computational method. Both methods can be checked by each other.
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  • [1] 魏开煌、陈伯飞、粱灿如、王林林,束流输运系统计算程序《TR(1)》汇编,中国科学院高能物理研究所内部报告(1979).
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Get Citation
WEI KAI-YU. THE BEAM ENVELOP ANALYSIS FOR NONPERIODIC SYSTEMS[J]. Chinese Physics C, 1981, 5(3): 328-333.
WEI KAI-YU. THE BEAM ENVELOP ANALYSIS FOR NONPERIODIC SYSTEMS[J]. Chinese Physics C, 1981, 5(3): 328-333. shu
Milestone
Received: 1980-02-11
Revised: 1900-01-01
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THE BEAM ENVELOP ANALYSIS FOR NONPERIODIC SYSTEMS

  • Institute of High Energy Physics, Academia Sinica

Abstract: The beam envelops for non-periodic alternating gradient focusing system is analysed. The accurate analytic expressions of the beam envelop function β is obtained by solving the following non-linear differential equation:(√β)н+Q(Z)√β-1/(√β)3=0,
The conditions of existing the maximum and the minimum of beam envelop are discussed. And we have derived the accurate formulae with which one can calculate the maximum and the minimum values of envelop and their position. The method developed in this paper is different from the convintional matrix computational method. Both methods can be checked by each other.

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