| Year |
Citation |
Score |
| 2019 |
Ciucu M, Lai T. Lozenge tilings of doubly-intruded hexagons Journal of Combinatorial Theory, Series A. 167: 294-339. DOI: 10.1016/J.Jcta.2019.05.004 |
0.595 |
|
| 2019 |
Lai T. Proof of a conjecture of Kenyon and Wilson on semicontiguous minors Journal of Combinatorial Theory, Series A. 161: 134-163. DOI: 10.1016/J.Jcta.2018.07.008 |
0.337 |
|
| 2019 |
Lai T, Rohatgi R. Enumeration of lozenge tilings of a hexagon with a shamrock missing on the symmetry axis Discrete Mathematics. 342: 451-472. DOI: 10.1016/J.Disc.2018.10.024 |
0.448 |
|
| 2018 |
Lai T. Lozenge Tilings of a Halved Hexagon with an Array of Triangles Removed from the Boundary Siam Journal On Discrete Mathematics. 32: 783-814. DOI: 10.1137/17M1128575 |
0.367 |
|
| 2018 |
Lai T, Rohatgi R. Cyclically symmetric lozenge tilings of a hexagon with four holes Advances in Applied Mathematics. 96: 249-285. DOI: 10.1016/J.Aam.2018.01.003 |
0.395 |
|
| 2017 |
Lai T. Perfect Matchings of Trimmed Aztec Rectangles Electronic Journal of Combinatorics. 24: 4-19. DOI: 10.37236/6440 |
0.356 |
|
| 2017 |
Lai T. A q-enumeration of lozenge tilings of a hexagon with four adjacent triangles removed from the boundary European Journal of Combinatorics. 64: 66-87. DOI: 10.1016/J.Ejc.2017.04.001 |
0.433 |
|
| 2017 |
Lai T. Proof of a refinement of Blum’s conjecture on hexagonal dungeons Discrete Mathematics. 340: 1617-1632. DOI: 10.1016/J.Disc.2017.03.003 |
0.397 |
|
| 2017 |
Lai T. A q-enumeration of lozenge tilings of a hexagon with three dents Advances in Applied Mathematics. 82: 23-57. DOI: 10.1016/J.Aam.2016.07.002 |
0.353 |
|
| 2017 |
Lai T, Musiker G. Beyond Aztec Castles: Toric Cascades in the dP 3 Quiver Communications in Mathematical Physics. 356: 823-881. DOI: 10.1007/S00220-017-2993-8 |
0.301 |
|
| 2016 |
Lai T. Enumeration of hybrid domino-lozenge tilings II: Quasi-octagonal regions Electronic Journal of Combinatorics. 23. DOI: 10.37236/4669 |
0.347 |
|
| 2016 |
Lai T. Enumeration of antisymmetric monotone triangles and domino tilings of quartered Aztec rectangles Discrete Mathematics. 339: 1512-1518. DOI: 10.1016/J.Disc.2015.12.027 |
0.396 |
|
| 2016 |
Lai T. A generalization of Aztec diamond theorem, part II Discrete Mathematics. 339: 1172-1179. DOI: 10.1016/J.Disc.2015.10.045 |
0.439 |
|
| 2016 |
Lai T. Double Aztec rectangles Advances in Applied Mathematics. 75: 1-17. DOI: 10.1016/J.Aam.2015.11.001 |
0.421 |
|
| 2016 |
Lai T. A Generalization of Aztec Dragons Graphs and Combinatorics. 1-21. DOI: 10.1007/S00373-016-1691-1 |
0.368 |
|
| 2016 |
Lai T. Generating Function of the Tilings of an Aztec Rectangle with Holes Graphs and Combinatorics. 32: 1039-1054. DOI: 10.1007/S00373-015-1616-4 |
0.399 |
|
| 2015 |
Lai T. A new proof for the number of lozenge tilings of quartered hexagons Discrete Mathematics. 338: 1866-1872. DOI: 10.1016/J.Disc.2015.04.024 |
0.443 |
|
| 2014 |
Lai T. Enumeration of tilings of quartered aztec rectangles Electronic Journal of Combinatorics. 21. DOI: 10.37236/4246 |
0.355 |
|
| 2014 |
Lai T. A simple proof for the number of tilings of quartered Aztec diamonds Electronic Journal of Combinatorics. 21. DOI: 10.37236/3429 |
0.431 |
|
| 2014 |
Ciucu M, Lai T. Proof of Blum's conjecture on hexagonal dungeons Journal of Combinatorial Theory. Series A. 125: 273-305. DOI: 10.1016/J.Jcta.2014.03.008 |
0.558 |
|
| 2014 |
Lai T. Enumeration of hybrid domino-lozenge tilings Journal of Combinatorial Theory. Series A. 122: 53-81. DOI: 10.1016/J.Jcta.2013.10.001 |
0.397 |
|
| 2014 |
Lai T. A generalization of Aztec diamond theorem, part I Electronic Journal of Combinatorics. 21. |
0.344 |
|
| 2013 |
Lai T. New aspects of regions whose tilings are enumerated by perfect powers Electronic Journal of Combinatorics. 20. DOI: 10.37236/3186 |
0.393 |
|
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