Classes of graphs with low complexity: The case of classes with bounded linear rankwidth
The result's identifiers
Result code in IS VaVaI
<a href="https://www.isvavai.cz/riv?ss=detail&h=RIV%2F00216208%3A11320%2F21%3A10422255" target="_blank" >RIV/00216208:11320/21:10422255 - isvavai.cz</a>
Result on the web
<a href="https://verso.is.cuni.cz/pub/verso.fpl?fname=obd_publikace_handle&handle=rb4StkImBZ" target="_blank" >https://verso.is.cuni.cz/pub/verso.fpl?fname=obd_publikace_handle&handle=rb4StkImBZ</a>
DOI - Digital Object Identifier
<a href="http://dx.doi.org/10.1016/j.ejc.2020.103223" target="_blank" >10.1016/j.ejc.2020.103223</a>
Alternative languages
Result language
angličtina
Original language name
Classes of graphs with low complexity: The case of classes with bounded linear rankwidth
Original language description
Classes with bounded rankwidth are MSO-transductions of trees and classes with bounded linear rankwidth are MSO-transductions of paths - a result that shows a strong link between the properties of these graph classes considered from the point of view of structural graph theory and from the point of view of finite model theory. We take both views on classes with bounded linear rankwidth and prove structural and model theoretic properties of these classes. The structural results we obtain are the following. (1) The number of unlabeled graphs of order n with linear rank-width at most r is at most [(2(r) + 1)(r + 1)! 2((2r))3(r+1)](n) (2) Graphs with linear rankwidth at most r are linearly chi-bounded. Actually, they have bounded c-chromatic number, meaning that they can be colored with f (r) colors, each color inducing a cograph. (3) To the contrary, based on a Ramsey-like argument, we prove for every proper hereditary family F-of graphs (like cographs) that there is a class with bounded rankwidth that does not have the property that graphs in it can be colored by a bounded number of colors, each inducing a subgraph in F. From the model theoretical side we obtain the following results: (1) A direct short proof that graphs with linear rankwidth at most r are first-order transductions of linear orders. This result could also be derived from Colcombet's theorem on firstorder transduction of linear orders and the equivalence of linear rankwidth with linear cliquewidth. (2) For a class b with bounded linear rankwidth the following conditions are equivalent: (a) b is stable, (b) b excludes some half-graph as a semi-induced subgraph, (c) b is a first-order transduction of a class with bounded pathwidth. These results open the perspective to study classes admitting low linear rankwidth covers. (C) 2020 Elsevier Ltd. All rights reserved.
Czech name
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Czech description
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Classification
Type
J<sub>imp</sub> - Article in a specialist periodical, which is included in the Web of Science database
CEP classification
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OECD FORD branch
10201 - Computer sciences, information science, bioinformathics (hardware development to be 2.2, social aspect to be 5.8)
Result continuities
Project
<a href="/en/project/GBP202%2F12%2FG061" target="_blank" >GBP202/12/G061: Center of excellence - Institute for theoretical computer science (CE-ITI)</a><br>
Continuities
P - Projekt vyzkumu a vyvoje financovany z verejnych zdroju (s odkazem do CEP)
Others
Publication year
2021
Confidentiality
S - Úplné a pravdivé údaje o projektu nepodléhají ochraně podle zvláštních právních předpisů
Data specific for result type
Name of the periodical
European Journal of Combinatorics
ISSN
0195-6698
e-ISSN
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Volume of the periodical
91
Issue of the periodical within the volume
January
Country of publishing house
GB - UNITED KINGDOM
Number of pages
29
Pages from-to
103223
UT code for WoS article
000579842800024
EID of the result in the Scopus database
2-s2.0-85089827039