Normal Modes, Rotational Inertia, and Thermal Fluctuations of Trapped Ion Crystals

Abstract: The normal modes of a trapped ion crystal are derived using an approach based on the Hermitian properties of the system's dynamical matrix. This method is equivalent to the standard Bogoliubov method, but for classical systems it is arguably simpler and more general in that canonical coordinates are not necessary. The theory is developed for stable, unstable, and neutrally-stable systems. The method is then applied to ion crystals in a Penning trap. Reduced eigenvalue problems for the case of large applied mag… Show more

“…the in-plane dynamics in the harmonic approximation can be expressed as d |q ⊥ /dt = D |q ⊥ [29], where D is a 4N × 4N matrix given by…”

Broadening of the drumhead mode spectrum due to in-plane thermal fluctuations of two-dimensional trapped ion crystals in a Penning trap

“…the in-plane dynamics in the harmonic approximation can be expressed as d |q ⊥ /dt = D |q ⊥ [29], where D is a 4N × 4N matrix given by…”

Broadening of the drumhead mode spectrum due to in-plane thermal fluctuations of two-dimensional trapped ion crystals in a Penning trap