Title :
Generalized Representation of Electric Fields in Sheet Beam Klystron Gaps
Author :
Jensen, Allan ; Fazio, Maria ; Neilson, Jeffrey M. ; Scheitrum, Glenn
Author_Institution :
Stanford Linear Accel. Center, Menlo Park, CA, USA
Abstract :
Kosmahl and Branch´s derivation for the electric field in a round beam gap is closely followed to derive the electric field for a sheet beam klystron gap. The wider of the two transverse dimensions of the gap is taken to be infinite in extent and the field is derived based on an approximation of the gap field at the drift tube edge. The electric field equations are generalized using a Fourier series representation of the gap field at the drift tube edge. The analytical results are compared with the numerical computations.
Keywords :
Fourier series; approximation theory; klystrons; Branch derivation; Fourier series representation; Kosmahl derivation; drift tube edge; electric field equation; gap field approximation; numerical computation; round beam gap; sheet beam klystron gap; transverse dimension; Approximation methods; Cavity resonators; Equations; Fourier series; Klystrons; Mathematical model; Cavity; electric field; klystron; sheet beam; sheet beam.;
Journal_Title :
Electron Devices, IEEE Transactions on
DOI :
10.1109/TED.2013.2294434
