8 citations to https://www.mathnet.ru/rus/tm1874
  1. Labardini-Fragoso D., Velasco D., “On a Family of Caldero-Chapoton Algebras That Have the Laurent Phenomenon”, J. Algebra, 520 (2019), 90–135  crossref  mathscinet  zmath  isi  scopus
  2. Chekhov L. Mazzocco M., “Colliding Holes in Riemann Surfaces and Quantum Cluster Algebras”, Nonlinearity, 31:1 (2018), 54–107  crossref  mathscinet  zmath  isi  scopus
  3. Chekhov L. Shapiro M., “Teichmüller Spaces of Riemann Surfaces with Orbifold Points of Arbitrary Order and Cluster Variables”, Int. Math. Res. Notices, 2014, no. 10, 2746–2772  crossref  mathscinet  zmath  isi  elib  scopus
  4. Chekhov L. Mazzocco M., “Teichmüller Spaces as Degenerated Symplectic Leaves in Dubrovin-Ugaglia Poisson Manifolds”, Physica D, 241:23-24 (2012), 2109–2121  crossref  mathscinet  zmath  adsnasa  isi  elib  scopus
  5. Chekhov L., Mazzocco M., “Isomonodromic deformations and twisted Yangians arising in Teichmüller theory”, Adv. Math., 226:6 (2011), 4731–4775  crossref  mathscinet  zmath  isi  elib  scopus
  6. Chekhov L., Mazzocco M., “Shear coordinate description of the quantized versal unfolding of a $D_4$ singularity”, J. Phys. A, 43:44 (2010), 442002, 13 pp.  crossref  mathscinet  zmath  adsnasa  isi  elib  scopus
  7. М. Маззокко, Л. О. Чехов, “Орбифолдные римановы поверхности: пространства Тейхмюллера и алгебры геодезических функций”, УМН, 64:6(390) (2009), 117–168  mathnet  crossref  mathscinet  zmath  adsnasa  elib; M. Mazzocco, L. O. Chekhov, “Orbifold Riemann surfaces: Teichmüller spaces and algebras of geodesic functions”, Russian Math. Surveys, 64:6 (2009), 1079–1130  crossref  isi  elib
  8. Chekhov L.O., “Orbifold Riemann surfaces and geodesic algebras”, J. Phys. A, 42:30 (2009), 304007, 32 pp.  crossref  mathscinet  zmath  isi  elib  scopus