Adjoint Approach to Accelerator Lattice Design

Antonsen, Tom; Beaudoin, Brian; Dovlatyan, Levon; Haber, Irving

doi:10.18429/JACoW-NAPAC2019-TUPLM03

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BiBTeX citation export for TUPLM03: Adjoint Approach to Accelerator Lattice Design

@InProceedings{antonsen:napac2019-tuplm03,
  author       = {T.M. Antonsen and B.L. Beaudoin and L. Dovlatyan and I. Haber},
  title        = {{Adjoint Approach to Accelerator Lattice Design}},
  booktitle    = {Proc. NAPAC'19},
  pages        = {376--378},
  paper        = {TUPLM03},
  language     = {english},
  keywords     = {lattice, focusing, simulation, quadrupole, plasma},
  venue        = {Lansing, MI, USA},
  series       = {North American Particle Accelerator Conference},
  number       = {4},
  publisher    = {JACoW Publishing, Geneva, Switzerland},
  month        = {10},
  year         = {2019},
  issn         = {2673-7000},
  isbn         = {978-3-95450-223-3},
  doi          = {10.18429/JACoW-NAPAC2019-TUPLM03},
  url          = {http://jacow.org/napac2019/papers/tuplm03.pdf},
  note         = {https://doi.org/10.18429/JACoW-NAPAC2019-TUPLM03},
  abstract     = {Accelerator lattices are designed using computer codes that solve the equations of motion for charged particles in both prescribed and self-consistent fields. These codes are run in a mode in which particles enter a lattice region, travel for a finite distance, and have their coordinates recorded to assess various figures of merit (FoMs). The lattice is then optimized by varying the positions and strengths of the focusing elements. This optimization is done in a high dimensional parameter space, requiring multiple simulations of the particle trajectories to determine the dependence of the confinement on the many parameters. Sophisticated algorithms for this optimization are being introduced. However, the process is still time consuming. We propose to alter the design process using "adjoint" techniques [*]. Incorporation of an "adjoint" calculation of the trajectories and self-fields can, in several runs, determine the gradient in parameter space of a given FoM with respect to all lattice parameters. It includes naturally self-fields and can be embedded in existing codes such as WARP or Vorpal. The theoretical basis for the method and several applications will be presented.},
}