Longitudinal modes of bunched beams with weak space charge

Longitudinal collective modes of a bunched beam with a repulsive inductive impedance (the space charge below transition or the chamber inductance above it) are analytically described by means of reduction of the linearized Vlasov equation to a parameterless integral equation. For any multipolarity, the discrete part of the spectrum is found to consist of infinite number of modes with real tunes, which limit point is the incoherent zero-amplitude frequency. In other words, notwithstanding the rf bucket nonlinearity and potential well distortion, the Landau damping is lost. Hence, even a tiny coupled-bunch interaction makes the beam unstable; such growth rates for all the modes are analytically obtained for arbitrary multipolarity. In practice, however, the finite threshold of this loss of Landau damping is set either by the high-frequency impedance roll-off or intrabeam scattering. Above the threshold, growth of the leading collective mode should result in persistent nonlinear oscillations.

Automated summary

In this study, longitudinal collective modes of a bunched beam with a repulsive inductive impedance are analytically described, finding that the discrete part of the spectrum consists of an infinite number of modes with real tunes. The loss of Landau damping and the mechanism leading to beam instability are analyzed in the presence of tiny coupled-bunch interactions.