
adress: | Pascal Gollin Discrete Mathematics Group Institute for Basic Science 55 Expo-ro, Yuseong-gu, Daejeon, Republic of Korea, 34126 |
office: | B209, Theory Building |
phone: | +82 42 878 9211 |
email: | pascalgollin [at] ibs.re.kr |
other: | Google Scholar profile MathSciNet Author ID: 1187500 Researcher ID: AAQ-6679-2020 ResearchGate profile Scopus ID: 57190127300 |
about me
I am a research fellow in the Discrete Mathematics Group (DIMAG), which is part of the Pioneer Research Center for Mathematical and Computational Sciences within the Institute for Basic Science (IBS) in South Korea.
I work in graph theory with a focus on structural graph theory of both finite and infinite graphs and digraphs.
I obtained my PhD in mathematics from the University of Hamburg, under the supervision of Reinhard Diestel.
PhD Thesis: Connectivity and tree structure in infinite graphs and digraphs
publications and preprints
- Ubiquity in graphs III: Ubiquity of locally finite graphs with extensive tree-decompositions
(with N. Bowler, C. Elbracht, J. Erde, K. Heuer, M. Pitz, and M. Teegen), Preprint, 2020, submitted
arXiv: 2012.13070 - Obstructions for bounded branch-depth in matroids
(with K. Hendrey, D. Mayhew, and S. Oum), Preprint, 2020, submitted
arXiv: 2003.13975 - Enlarging vertex-flames in countable digraphs
(with J. Erde and A. Joó), Preprint, 2020, submitted
arXiv: 2003.06178 - Base partition for finitary-cofinatary matroid families
(with J. Erde, A. Joó, P. Knappe, and M. Pitz), Combinatorica, 2020
doi: 10.1007/s00493-020-4422-4, arXiv: 1910.05601 - On the infinite Lucchesi-Younger Conjecture I
(with K. Heuer), Preprint, 2019, submitted
arXiv: 1909.08373 - Representations of infinite tree sets
(with J. Kneip), Order, 2020
doi: 10.1007/s11083-020-09529-0, arXiv: 1908.10327 - A Cantor-Bernstein-type theorem for spanning trees in infinite graphs
(with J. Erde, A. Joó, P. Knappe, and M. Pitz), Journal of Combinatorial Theory Series B 149:16-22, 2021
doi: 10.1016/j.jctb.2021.01.004, arXiv: 1907.09338 - Characterising k-connected sets in infinite graphs
(with K. Heuer), Preprint, 2018, submitted
arXiv: 1811.06411 - Ubiquity in graphs II: Ubiquity of graphs with nowhere-linear end structure
(with N. Bowler, C. Elbracht, J. Erde, K. Heuer, M. Pitz, and M. Teegen), Preprint, 2018, submitted
arXiv: 1809.00602 - Ubiquity in graphs I: Topological ubiquity of trees
(with N. Bowler, C. Elbracht, J. Erde, K. Heuer, M. Pitz, and M. Teegen), Preprint, 2018, submitted
arXiv: 1806.04008 - An analogue of Edmonds’ Branching Theorem for infinite digraphs
(with K. Heuer), European Journal of Combinatorics 92, 2021
doi: 10.1016/j.ejc.2020.103182, arXiv: 1805.02933, MR: 4142158. - Infinite end-devouring sets of rays with prescribed start vertices
(with K. Heuer), Discrete Mathematics 341(7):2117-2120, 2018
doi: 10.1016/j.disc.2018.04.012, arXiv: 1704.06577, MR: 3802167 - Canonical tree-decompositions of a graph that display its k-blocks
(with J. Carmesin), Journal of Combinatorial Theory Series B 122:1-20, 2017
doi: 10.1016/j.jctb.2016.05.001, arXiv: 1506.02904, MR: 3575193