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Modeling of Nonlinear Interaction of Space Charge Waves with Trapped Particles

Sayavur I. Bakhtiyarov*, Dale C. Ferguson **

* New Mexico Institute of Mining and Technology, Socorro, New Mexico, USA.

** Air Force Research Laboratory, Space Vehicles Directorate, Kirtland AFB, New Mexico, USA.

Periodicity:February - April'2021
DOI : https://doi.org/10.26634/jfet.16.3.17867

Abstract

In this paper, we developed a mathematical model to evaluate nonlinear interaction between the space charge waves of electrons and charged particles (electrons, protons, ions) trapped in the matrix material. An interaction between the electron beam and the charged particles already trapped in the matrix is described by the Poisson's elliptic partial differential equation. The motion of electron beam has been described by the momentum and the conversation of charge equations. The system of differential equations has been solved by Krylov-Bogolyubov's method of averaging. Numerical simulations have been conducted using SIMULINK®.

Keywords

Space Charge, Nonlinear, Electron Beam, Eigen Wave.

How to Cite this Article?

Bakhtiyarov, S. I., and Ferguson, D. C. (2021). Modeling of Nonlinear Interaction of Space Charge Waves with Trapped Particles. i-manager's Journal on Future Engineering and Technology, 16(3), 1-7. https://doi.org/10.26634/jfet.16.3.17867

References

[1]. Allahdadi, F. A., Bakhtiyarov, S. I., Wyss, G. D., Polansky, G. F., Sholtis, J. A. and Botts, C. D. (2013). Nuclear-powered payload safety. In F. A. Allahdadi (Ed.), Safety design for space operations, (pp. 255-370). Butterworth-Heinemann: Elsevier Ltd.

[2]. Aslaninejad, M., & Hofmann, I. (2003). Effect of space charge on linear coupling and gradient errors in highintensity rings. Physical Review Special Topics-Accelerators and Beams, 6(12), 1-11.

[3]. Asvesta, F., Antoniou, F., Bartosik, H., Di Giovanni, G. P. & Papaphilippou, Y. (2019). Coupling and space charge studies at the CERN PSB. Journal of Physics: Conference Series, 1350, 1-6.

[4]. Bakhtiyarov, S. I., & Ferguson, D. C. (2020a). Modeling of dielectric behavior of polymer materials embedded with metal-doped nanoparticles that contain interphasial space charges. i-manager's Journal on Future Engineering and Technology, 15(2), 1-7.

[5]. Bakhtiyarov,S. I., & Ferguson, D. C. (2020b). Modeling of dielectric behavior of nanocomposites with interphasial space charges. In AIAA Aviation 2020 Forum: Observations and Modeling of the Atmospheric Environment.

[6]. Bao, G. (2012). The ASTROD I charging simulation and disturbances due to solar energetic particles at 0.5 AU. Acta Astronautica, 77, 29-33.

[7]. Blaskiewicz, M. (2001). Transverse stability with nonlinear space charge. Physical Review Special Topics: Accelerators and Beams, 4(044202), 1-9.

[8]. Franchetti, G., Hofmann, I., & Aslaninejad, M. (2005). Collective emittance exchange with linear space charge forces and linear coupling. Physical Review Letters, 94(19), 194801(1-4).

[9]. Franchetti, G., Hofmann, I., & Turchetti, G. (1998, November). Micromap approach to space charge in a synchrotron. In AIP Conference Proceedings (Vol. 448, No. 1, pp. 233-244). American Institute of Physics.

[10]. Hofmann, I. & Boine-Frankenheim, O. (2001). Resonant emittance transfer driven by space charge. Physical Review Letters, 87(034802), 1-4.

[11]. Hofmann, I. & Franchetti,G. (2006). Scaling laws for the Montague resonance. In Proceedings of European Particle Accelerator Conference (pp. 2796-2798).

[12]. Hofmann, I. (1998). Stability of anisotropic beams with space charge. Physical Review E, 57(4), 4713-4724.

[13]. Ivanov, A. A., Korshunov, S. M., Beryuleva, N. S. & Tarasov, S. P. (1974). Nonlinear interaction of space-charge waves with trapped electrons. Soviet Physics: Journal of Experimental and Theoretical Physics, 38(5), 927-930.

[14]. Kapchinsky I. (1985). Theory of resonance linear accelerators, New York: Harwood Academic Publishers.

[15]. Kapchinsky, I. M., & Vladimirsky, V. V. (1959). Limitations of proton beam current in a strong focusing linear accelerator associated with strong space charge. In 9th International Conference on High Energy Accelerators (pp. 274–288).

[16]. Korshunov, S. M. (1972). Two-stream instability in the presence of trapped electrons. Soviet Physics: Journal of Experimental and Theoretical Physics, 35, 917-919.

[17]. Lyu, L. H. (2010). Introduction to nonlinear space plasma physics. Nonlinear Space Plasma Physics (I) Lecture Notes, (pp. 1-7).

[18]. Moehl, D. & Schoenauer, H. (1974). Landau damping by non-linear space-charge forces and octupoles. In Proceedings of the 9th International Conference on High Energy Accelerators, Stanford (pp. 380-384).

[19]. Montague, B. W. S. L. (1968). Fourth-order coupling resonance excited by space-charge forces in a synchrotron (No. CERN-68-38). Conseil Européen pour la Recherche Nucléaire, Geneva, Switzerland.

Modeling of Nonlinear Interaction of Space Charge Waves with Trapped Particles

Abstract

Keywords

How to Cite this Article?

References

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