@unpublished{64871,
  author       = {{Rahangdale, Praful}},
  title        = {{{Drinfeld correspondence in infinite dimensions}}},
  year         = {{2026}},
}

@unpublished{63602,
  abstract     = {{We show that, on a smoothly paracompact convenient manifold $M$ modeled on a convenient space with the bornological approximation property, the dual map of a Poisson bracket factors as a smooth section of the vector bundle $L_{skew}^2(T^*M,\mathbb R)$.}},
  author       = {{Michor,  P. W. and Rahangdale, Praful}},
  title        = {{{Poisson bivectors on infinite dimensional manifolds}}},
  year         = {{2025}},
}

@inproceedings{63605,
  author       = {{Tomasz	Goliński, Tomasz	 and Rahangdale, Praful and Tumpach, Alice Barbora}},
  booktitle    = {{Geometric Methods in Physics, XLI Workshop}},
  editor       = {{Kielanowski, P. and Dobrogowska, A. and Fernández, D. and Goliński, D.}},
  isbn         = {{978-3-031-89857-0}},
  location     = {{Białystok, Poland}},
  pages        = {{97–117}},
  publisher    = {{Birkhauser}},
  title        = {{{Poisson structures in the Banach setting: comparison of different approaches}}},
  doi          = {{10.1007/978-3-031-89857-0_9}},
  year         = {{2024}},
}