id |
oapen-20.500.12657-88064
|
record_format |
dspace
|
spelling |
oapen-20.500.12657-880642024-03-28T14:03:25Z Dualities in graphs and digraphs Hatzel, Meike directed graphs; directed graph structure theory; butterfly minors; induced subgraphs; width measures thema EDItEUR::P Mathematics and Science::PB Mathematics thema EDItEUR::U Computing and Information Technology::UY Computer science::UYA Mathematical theory of computation In this thesis we describe dualities in directed as well as undirected graphs based on tools such as width-parameters, obstructions and substructures. We mainly focus on directed graphs and their structure. In the context of a long open conjecture that bounds the monotonicity costs of a version of the directed cops and robber game, we introduce new width-measures based on directed separations that are closely related to DAG-width. We identify a tangle-like obstruction for which we prove a duality theorem. Johnson, Reed, Robertson, Seymour and Thomas introduced the width measure directed treewidth as a generalisation of treewidth for directed graphs. We introduce a new width measure, the cyclewidth, which is parametrically equivalent to directed treewidth. Making use of the connection between directed graphs and bipartite graphs with perfect matchings we characterise the digraphs of low cyclewidth. Generalising the seminal work by Robertson and Seymour resulting in a global structure theorem for undirected graphs, there is the goal of obtaining a structure theorem, based on directed treewidth, describing the structure of the directed graphs excluding a fixed butterfly minor. Working in this direction we present a new flat wall theorem for directed graphs which we believe to provide a better base for a directed structure theorem than the existing ones. On undirected graphs we present several results on induced subgraphs in the graphs themselves or the square graph of their linegraph. These results range from general statements about all graphs to the consideration of specific graph classes such as the one with exactly two moplexes. 2024-02-29T10:07:11Z 2024-02-29T10:07:11Z 2023 book 9783798332911 https://library.oapen.org/handle/20.500.12657/88064 eng Foundations of Computing application/pdf Attribution 4.0 International hatzel_meike.pdf https://verlag.tu-berlin.de/produkt/978-3-7983-3291-1/ Universitätsverlag der Technischen Universität Berlin 10.14279/depositonce-16147 10.14279/depositonce-16147 e5e3d993-eb32-46aa-8ee9-b5f168659224 9783798332911 17 294 Berlin open access
|
institution |
OAPEN
|
collection |
DSpace
|
language |
English
|
description |
In this thesis we describe dualities in directed as well as undirected graphs based on tools such as width-parameters, obstructions and substructures. We mainly focus on directed graphs and their structure. In the context of a long open conjecture that bounds the monotonicity costs of a version of the directed cops and robber game, we introduce new width-measures based on directed separations that are closely related to DAG-width. We identify a tangle-like obstruction for which we prove a duality theorem. Johnson, Reed, Robertson, Seymour and Thomas introduced the width measure directed treewidth as a generalisation of treewidth for directed graphs. We introduce a new width measure, the cyclewidth, which is parametrically equivalent to directed treewidth. Making use of the connection between directed graphs and bipartite graphs with perfect matchings we characterise the digraphs of low cyclewidth. Generalising the seminal work by Robertson and Seymour resulting in a global structure theorem for undirected graphs, there is the goal of obtaining a structure theorem, based on directed treewidth, describing the structure of the directed graphs excluding a fixed butterfly minor. Working in this direction we present a new flat wall theorem for directed graphs which we believe to provide a better base for a directed structure theorem than the existing ones. On undirected graphs we present several results on induced subgraphs in the graphs themselves or the square graph of their linegraph. These results range from general statements about all graphs to the consideration of specific graph classes such as the one with exactly two moplexes.
|
title |
hatzel_meike.pdf
|
spellingShingle |
hatzel_meike.pdf
|
title_short |
hatzel_meike.pdf
|
title_full |
hatzel_meike.pdf
|
title_fullStr |
hatzel_meike.pdf
|
title_full_unstemmed |
hatzel_meike.pdf
|
title_sort |
hatzel_meike.pdf
|
publisher |
Universitätsverlag der Technischen Universität Berlin
|
publishDate |
2024
|
url |
https://verlag.tu-berlin.de/produkt/978-3-7983-3291-1/
|
_version_ |
1799945278108729344
|