Investigations on Dynamical Stability in 3D Quadrupole Ion Traps

Abstract: We firstly discuss classical stability for a dynamical system of two ions levitated in a 3D Radio-Frequency (RF) trap, assimilated with two coupled oscillators. We obtain the solutions of the coupled system of equations that characterizes the associated dynamics. In addition, we supply the modes of oscillation and demonstrate the weak coupling condition is inappropriate in practice, while for collective modes of motion (and strong coupling) only a peak of the mass can be detected. Phase portraits and power spe… Show more

“…In addition, the expectation values of the quantum Hamilton function reduced through the evolution operators applied to such states, determine a classical Hamiltonian that exhibits a time periodic perturbative term [36]. By averaging this Hamiltonian [105], an autonomous dynamical system results whose equilibrium configurations determine the family of ordered structures (ion crystals) [58]. In order for the trapped ion system to be stable, the associated quasienergy spectrum must be discrete [13,28,36].…”

“…As demonstrated in [13,30] the quantum quasienergy states are symplectic coherent states. We employ the analytical model presented in [58] and introduce the relative coordinates y αj , as well as the collective variables s defined as:…”

“…The configurations of minimum are exactly the regions where ion crystals are created [15,36,58]. In case of a one dimensional (1D) integrable dynamical system with N particles, that corresponds to the Calogero potential [104]…”

“…The expectation values of the quantum Hamilton function reduced through the evolution operators applied to such states, determine a classical Hamilton function with a perturbative term that is time periodic [36]. By averaging this Hamiltonian [105], an autonomous dynamical system results whose equilibrium configurations determine the family of ordered structures (ion crystals) [58].…”

“…In order for the trapped ion system to be stable, the associated quasienergy spectrum has to be discrete [13,28,36]. We then use the analytical model introduced in [58] and describe collective motion by means of collective variables. We find the equilibrum points for a 3D quadrupole ion trap (QIT).…”

Quasienergy operators and generalized squeezed states for systems of trapped ions

“…In addition, the expectation values of the quantum Hamilton function reduced through the evolution operators applied to such states, determine a classical Hamiltonian that exhibits a time periodic perturbative term [36]. By averaging this Hamiltonian [105], an autonomous dynamical system results whose equilibrium configurations determine the family of ordered structures (ion crystals) [58]. In order for the trapped ion system to be stable, the associated quasienergy spectrum must be discrete [13,28,36].…”

“…As demonstrated in [13,30] the quantum quasienergy states are symplectic coherent states. We employ the analytical model presented in [58] and introduce the relative coordinates y αj , as well as the collective variables s defined as:…”

“…The configurations of minimum are exactly the regions where ion crystals are created [15,36,58]. In case of a one dimensional (1D) integrable dynamical system with N particles, that corresponds to the Calogero potential [104]…”

“…The expectation values of the quantum Hamilton function reduced through the evolution operators applied to such states, determine a classical Hamilton function with a perturbative term that is time periodic [36]. By averaging this Hamiltonian [105], an autonomous dynamical system results whose equilibrium configurations determine the family of ordered structures (ion crystals) [58].…”

“…In order for the trapped ion system to be stable, the associated quasienergy spectrum has to be discrete [13,28,36]. We then use the analytical model introduced in [58] and describe collective motion by means of collective variables. We find the equilibrum points for a 3D quadrupole ion trap (QIT).…”

Quasienergy operators and generalized squeezed states for systems of trapped ions

Quasienergy operators and generalized squeezed states for systems of trapped ions

Classical and quantum integrability of the three-dimensional generalized trapped ion Hamiltonian