@article{2345,
  abstract     = {We give upper bounds for the number of spin-1/2 particles that can be bound to a nucleus of charge Z in the presence of a magnetic field B, including the spin-field coupling. We use Lieb's strategy, which is known to yield Nc < 2Z + 1 for magnetic fields that go to zero at infinity, ignoring the spin-field interaction. For particles with fermionic statistics in a homogeneous magnetic field our upper bound has an additional term of the order of Z × min {(B/Z3)2/5, 1 + | 1n(B/Z3)|2}.},
  author       = {Seiringer, Robert},
  issn         = {0305-4470},
  journal      = {Journal of Physics A: Mathematical and General},
  number       = {9},
  pages        = {1943 -- 1948},
  publisher    = {IOP Publishing Ltd.},
  title        = {{On the maximal ionization of atoms in strong magnetic fields}},
  doi          = {10.1088/0305-4470/34/9/311},
  volume       = {34},
  year         = {2001},
}