@article{12764,
  abstract     = {We study a new discretization of the Gaussian curvature for polyhedral surfaces. This discrete Gaussian curvature is defined on each conical singularity of a polyhedral surface as the quotient of the angle defect and the area of the Voronoi cell corresponding to the singularity. We divide polyhedral surfaces into discrete conformal classes using a generalization of discrete conformal equivalence pioneered by Feng Luo. We subsequently show that, in every discrete conformal class, there exists a polyhedral surface with constant discrete Gaussian curvature. We also provide explicit examples to demonstrate that this surface is in general not unique.},
  author       = {Kourimska, Hana},
  issn         = {1432-0444},
  journal      = {Discrete and Computational Geometry},
  pages        = {123--153},
  publisher    = {Springer Nature},
  title        = {{Discrete yamabe problem for polyhedral surfaces}},
  doi          = {10.1007/s00454-023-00484-2},
  volume       = {70},
  year         = {2023},
}

@article{10071,
  author       = {Adams, Henry and Kourimska, Hana and Heiss, Teresa and Percival, Sarah and Ziegelmeier, Lori},
  issn         = {1088-9477},
  journal      = {Notices of the American Mathematical Society},
  number       = {9},
  pages        = {1511--1514},
  publisher    = {American Mathematical Society},
  title        = {{How to tutorial-a-thon}},
  doi          = {10.1090/noti2349},
  volume       = {68},
  year         = {2021},
}