@article{53321,
  abstract     = {{<jats:p> The chemotaxis system [Formula: see text] is considered in a ball [Formula: see text], [Formula: see text], where the positive function [Formula: see text] reflects suitably weak diffusion by satisfying [Formula: see text] for some [Formula: see text]. It is shown that whenever [Formula: see text] is positive and satisfies [Formula: see text] as [Formula: see text], one can find a suitably regular nonlinearity [Formula: see text] with the property that at each sufficiently large mass level [Formula: see text] there exists a globally defined radially symmetric classical solution to a Neumann-type boundary value problem for (⋆) which satisfies [Formula: see text] </jats:p>}},
  author       = {{Winkler, Michael}},
  issn         = {{0219-1997}},
  journal      = {{Communications in Contemporary Mathematics}},
  keywords     = {{Applied Mathematics, General Mathematics}},
  number       = {{10}},
  publisher    = {{World Scientific Pub Co Pte Ltd}},
  title        = {{{Arbitrarily fast grow-up rates in quasilinear Keller–Segel systems}}},
  doi          = {{10.1142/s0219199722500626}},
  volume       = {{25}},
  year         = {{2022}},
}

@article{63282,
  abstract     = {{<jats:p> The chemotaxis system [Formula: see text] is considered in a ball [Formula: see text], [Formula: see text], where the positive function [Formula: see text] reflects suitably weak diffusion by satisfying [Formula: see text] for some [Formula: see text]. It is shown that whenever [Formula: see text] is positive and satisfies [Formula: see text] as [Formula: see text], one can find a suitably regular nonlinearity [Formula: see text] with the property that at each sufficiently large mass level [Formula: see text] there exists a globally defined radially symmetric classical solution to a Neumann-type boundary value problem for (⋆) which satisfies [Formula: see text] </jats:p>}},
  author       = {{Winkler, Michael}},
  issn         = {{0219-1997}},
  journal      = {{Communications in Contemporary Mathematics}},
  number       = {{10}},
  publisher    = {{World Scientific Pub Co Pte Ltd}},
  title        = {{{Arbitrarily fast grow-up rates in quasilinear Keller–Segel systems}}},
  doi          = {{10.1142/s0219199722500626}},
  volume       = {{25}},
  year         = {{2022}},
}