@article{34814,
  author       = {{Hanusch, Maximilian}},
  issn         = {{0008-414X}},
  journal      = {{Canadian Journal of Mathematics}},
  keywords     = {{extension of differentiable maps}},
  number       = {{1}},
  pages        = {{170--201}},
  publisher    = {{Canadian Mathematical Society}},
  title        = {{{A $C^k$-seeley-extension-theorem for Bastiani’s differential calculus}}},
  doi          = {{10.4153/s0008414x21000596}},
  volume       = {{75}},
  year         = {{2023}},
}

@article{40053,
  author       = {{Graczyk, P. and Luks, Tomasz and Sawyer, P.}},
  issn         = {{0008-414X}},
  journal      = {{Canadian Journal of Mathematics}},
  number       = {{4}},
  pages        = {{1005--1033}},
  publisher    = {{Canadian Mathematical Society}},
  title        = {{{Potential kernels for radial Dunkl Laplacians}}},
  doi          = {{10.4153/s0008414x21000195}},
  volume       = {{74}},
  year         = {{2022}},
}

@article{64630,
  author       = {{Glöckner, Helge}},
  issn         = {{0008-414X}},
  journal      = {{Canadian Journal of Mathematics}},
  keywords     = {{22E65, 22A05, 22E67, 46A13, 46M40, 58D05}},
  number       = {{1}},
  pages        = {{131–152}},
  title        = {{{Completeness of infinite-dimensional Lie groups in their left uniformity}}},
  doi          = {{10.4153/CJM-2017-048-5}},
  volume       = {{71}},
  year         = {{2019}},
}

@article{64667,
  author       = {{Birth, Lidia and Glöckner, Helge}},
  issn         = {{0008-414X}},
  journal      = {{Canadian Journal of Mathematics}},
  keywords     = {{22E30, 46F05, 22D15, 42A85, 43A10, 43A15, 46A03, 46A13, 46E25}},
  number       = {{1}},
  pages        = {{102–140}},
  title        = {{{Continuity of convolution of test functions on Lie groups}}},
  doi          = {{10.4153/CJM-2012-035-6}},
  volume       = {{66}},
  year         = {{2014}},
}

@article{64711,
  author       = {{Glöckner, Helge}},
  issn         = {{0008-414X}},
  journal      = {{Canadian Journal of Mathematics}},
  keywords     = {{22E67, 46E40, 46T20}},
  number       = {{5}},
  pages        = {{969–999}},
  title        = {{{Lie groups of measurable mappings.}}},
  doi          = {{10.4153/CJM-2003-039-9}},
  volume       = {{55}},
  year         = {{2003}},
}

@article{40192,
  abstract     = {{<jats:title>Abstract</jats:title><jats:p>If<jats:italic>G</jats:italic>is a closed subgroup of a commutative hypergroup<jats:italic>K</jats:italic>, then the coset space<jats:italic>K</jats:italic>/<jats:italic>G</jats:italic>carries a quotient hypergroup structure. In this paper, we study related convolution structures on<jats:italic>K</jats:italic>/<jats:italic>G</jats:italic>coming fromdeformations of the quotient hypergroup structure by certain functions on<jats:italic>K</jats:italic>which we call partial characters with respect to<jats:italic>G</jats:italic>. They are usually not probability-preserving, but lead to so-called signed hypergroups on<jats:italic>K</jats:italic>/<jats:italic>G</jats:italic>. A first example is provided by the Laguerre convolution on [0, ∞[, which is interpreted as a signed quotient hypergroup convolution derived from the Heisenberg group. Moreover, signed hypergroups associated with the Gelfand pair (<jats:italic>U</jats:italic>(<jats:italic>n</jats:italic>, 1),<jats:italic>U</jats:italic>(<jats:italic>n</jats:italic>)) are discussed.</jats:p>}},
  author       = {{Rösler, Margit and Voit, Michael}},
  issn         = {{0008-414X}},
  journal      = {{Canadian Journal of Mathematics}},
  keywords     = {{General Mathematics}},
  number       = {{1}},
  pages        = {{96--116}},
  publisher    = {{Canadian Mathematical Society}},
  title        = {{{Partial Characters and Signed Quotient Hypergroups}}},
  doi          = {{10.4153/cjm-1999-006-6}},
  volume       = {{51}},
  year         = {{1999}},
}