Tree-width and dimension G Joret, P Micek, KG Milans, WT Trotter, B Walczak, R Wang Combinatorica 36 (4), 431-450, 2016 | 43 | 2016 |
On the dimension of posets with cover graphs of treewidth 2 G Joret, P Micek, WT Trotter, R Wang, V Wiechert Order 34, 185-234, 2017 | 32* | 2017 |
Posets and VPG graphs E Cohen, MC Golumbic, WT Trotter, R Wang Order 33, 39-49, 2016 | 18 | 2016 |
Dimension and cut vertices: an application of Ramsey theory WT Trotter, B Walczak, R Wang Connections in discrete mathematics, 187-199, 2018 | 13 | 2018 |
Planar posets, dimension, breadth and the number of minimal elements WT Trotter, R Wang Order 33, 333-346, 2016 | 11* | 2016 |
Incidence posets and cover graphs WT Trotter, R Wang Order 31, 279-287, 2014 | 10 | 2014 |
Dimension of posets with planar cover graphs excluding two long incomparable chains DM Howard, N Streib, WT Trotter, B Walczak, R Wang Journal of Combinatorial Theory, Series A 164, 1-23, 2019 | 8 | 2019 |
Dimension and matchings in comparability and incomparability graphs WT Trotter, R Wang Order 33, 101-119, 2016 | 5 | 2016 |
Random bipartite posets and extremal problems C Biró, P Hamburger, HA Kierstead, A Pór, WT Trotter, R Wang Acta Mathematica Hungarica 161 (2), 618-646, 2020 | 2 | 2020 |
Combinatorial problems for graphs and partially ordered sets R Wang Georgia Institute of Technology, 2015 | 2 | 2015 |
Planar posets that are accessible from below have dimension at most 6 C Biró, B Bosek, HC Smith, WT Trotter, R Wang, SJ Young Order 38, 21-36, 2021 | 1 | 2021 |