16 citations to https://www.mathnet.ru/eng/vmumm4337
  1. D. A. Tuniyants, “Topologiya izoenergeticheskikh poverkhnostei bilyardnykh knizhek, skleennykh iz kolets”, Vestn. Mosk. un-ta. Ser. 1. Matem., mekh., 2024, no. 3, 26–35  mathnet  crossref  elib
  2. V. N. Zav'yalov, “Billiard with slipping by an arbitrary rational angle”, Sb. Math., 214:9 (2023), 1191–1211  mathnet  crossref  crossref  mathscinet  adsnasa  isi
  3. A. T. Fomenko, V. V. Vedyushkina, “Billiards and integrable systems”, Russian Math. Surveys, 78:5 (2023), 881–954  mathnet  crossref  crossref  mathscinet  adsnasa  isi
  4. A. A. Kuznetsova, “Modeling of degenerate peculiarities of integrable billiard systems by billiard books”, Moscow University Mathematics Bulletin, Moscow University Måchanics Bulletin, 78:5 (2023), 207–215  mathnet  mathnet  crossref  crossref
  5. G. V. Belozerov, “Topological classification of billiards bounded by confocal quadrics in three-dimensional Euclidean space”, Sb. Math., 213:2 (2022), 129–160  mathnet  crossref  crossref  mathscinet  adsnasa  isi
  6. Vladimir Dragović, Sean Gasiorek, Milena Radnović, “Billiard Ordered Games and Books”, Regul. Chaotic Dyn., 27:2 (2022), 132–150  mathnet  crossref  mathscinet
  7. A. T. Fomenko, V. V. Vedyushkina, “Evolutionary force billiards”, Izv. Math., 86:5 (2022), 943–979  mathnet  crossref  crossref  mathscinet  adsnasa  isi
  8. V. V. Vedyushkina, V. N. Zav'yalov, “Realization of geodesic flows with a linear first integral by billiards with slipping”, Sb. Math., 213:12 (2022), 1645–1664  mathnet  crossref  crossref  mathscinet  adsnasa  isi
  9. G. V. Belozerov, “Topology of $5$-surfaces of a 3D billiard inside a triaxial ellipsoid with Hooke's potential”, Moscow University Mathematics Bulletin, 77:6 (2022), 277–289  mathnet  crossref  crossref  mathscinet  zmath  elib
  10. V. V. Vedyushkina, V. A. Kibkalo, “Billiardnye knizhki maloi slozhnosti i realizatsiya sloenii Liuvillya integriruemykh sistem”, Chebyshevskii sb., 23:1 (2022), 53–82  mathnet  crossref
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