This book presents a theory whose goal is to structure the conceptual framework metaphorically in a way consistent with the metaphors of accelerator physicists. It argues that a theory should focus on the primary metaphor, the magnet, and build mathematical objects out of these magnets, beam lines.
This book presents a theory whose goal is to structure the conceptual framework metaphorically in a way consistent with the metaphors of accelerator physicists. It argues that a theory should focus on the primary metaphor, the magnet, and build mathematical objects out of these magnets, beam lines.
A pictorial view in one degree of freedom from the Hamiltonian to the map classification of one-turn maps from linear to nonlinear maps vector fields and canonical transformations the ring floquet rings a theoretical construct power series and analytic/symbolic calculations examples of the analytical normalization the layout in the laboratory frame symplectic integration "small" rings - using the correct Hamiltonian fringe effects in ring dynamics large ring approximations and the rest inclusion of radiation.
A pictorial view in one degree of freedom from the Hamiltonian to the map classification of one-turn maps from linear to nonlinear maps vector fields and canonical transformations the ring floquet rings a theoretical construct power series and analytic/symbolic calculations examples of the analytical normalization the layout in the laboratory frame symplectic integration "small" rings - using the correct Hamiltonian fringe effects in ring dynamics large ring approximations and the rest inclusion of radiation.
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