Extending precolorings to distinguish group actions. (August 2018)
- Record Type:
- Journal Article
- Title:
- Extending precolorings to distinguish group actions. (August 2018)
- Main Title:
- Extending precolorings to distinguish group actions
- Authors:
- Ferrara, Michael
Gethner, Ellen
Hartke, Stephen G.
Stolee, Derrick
Wenger, Paul S. - Abstract:
- Abstract: Given a group Γ acting on a set X, a k -coloring ϕ : X → { 1, …, k } of X is distinguishing with respect to Γ if the only γ ∈ Γ that fixes ϕ is the identity action. The distinguishing number of the action Γ, denoted D Γ ( X ), is then the smallest positive integer k such that there is a distinguishing k -coloring of X with respect to Γ . This notion has been studied in a number of settings, but by far the largest body of work has been concerned with finding the distinguishing number of the action of the automorphism group of a graph G upon its vertex set, which is referred to as the distinguishing number of G . The distinguishing number of a group action is a measure of how difficult it is to "break" all of the permutations arising from that action. In this paper, we aim to further differentiate the resilience of group actions with the same distinguishing number. In particular, we introduce a precoloring extension framework to address this issue. A set S ⊆ X is a fixing set for Γ if for every non-identity element γ ∈ Γ there is an element s ∈ S such that γ ( s ) ≠ s . The distinguishing extension number ext D ( X, Γ ; k ) is the minimum number m such that for all fixing sets W ⊆ X with | W | ≥ m, every k -coloring c : X ∖ W → [ k ] can be extended to a k -coloring that distinguishes X . In this paper, we prove that ext D ( R, Aut ( R ) ; 2 ) = 4, where Aut ( R ) is comprised of compositions of translations and reflections. We also consider the distinguishingAbstract: Given a group Γ acting on a set X, a k -coloring ϕ : X → { 1, …, k } of X is distinguishing with respect to Γ if the only γ ∈ Γ that fixes ϕ is the identity action. The distinguishing number of the action Γ, denoted D Γ ( X ), is then the smallest positive integer k such that there is a distinguishing k -coloring of X with respect to Γ . This notion has been studied in a number of settings, but by far the largest body of work has been concerned with finding the distinguishing number of the action of the automorphism group of a graph G upon its vertex set, which is referred to as the distinguishing number of G . The distinguishing number of a group action is a measure of how difficult it is to "break" all of the permutations arising from that action. In this paper, we aim to further differentiate the resilience of group actions with the same distinguishing number. In particular, we introduce a precoloring extension framework to address this issue. A set S ⊆ X is a fixing set for Γ if for every non-identity element γ ∈ Γ there is an element s ∈ S such that γ ( s ) ≠ s . The distinguishing extension number ext D ( X, Γ ; k ) is the minimum number m such that for all fixing sets W ⊆ X with | W | ≥ m, every k -coloring c : X ∖ W → [ k ] can be extended to a k -coloring that distinguishes X . In this paper, we prove that ext D ( R, Aut ( R ) ; 2 ) = 4, where Aut ( R ) is comprised of compositions of translations and reflections. We also consider the distinguishing extension number of the circle and (finite) cycles, obtaining several exact results and bounds. … (more)
- Is Part Of:
- European journal of combinatorics. Volume 72(2018)
- Journal:
- European journal of combinatorics
- Issue:
- Volume 72(2018)
- Issue Display:
- Volume 72, Issue 2018 (2018)
- Year:
- 2018
- Volume:
- 72
- Issue:
- 2018
- Issue Sort Value:
- 2018-0072-2018-0000
- Page Start:
- 12
- Page End:
- 28
- Publication Date:
- 2018-08
- Subjects:
- Combinatorial analysis -- Periodicals
Analyse combinatoire -- Périodiques
Combinatorial analysis
Periodicals
Electronic journals
511.6 - Journal URLs:
- http://www.sciencedirect.com/science/journal/01956698 ↗
http://www.elsevier.com/journals ↗
http://www.idealibrary.com ↗
http://firstsearch.oclc.org ↗
http://firstsearch.oclc.org/journal=0195-6698;screen=info;ECOIP ↗ - DOI:
- 10.1016/j.ejc.2018.03.008 ↗
- Languages:
- English
- ISSNs:
- 0195-6698
- Deposit Type:
- Legaldeposit
- View Content:
- Available online (eLD content is only available in our Reading Rooms) ↗
- Physical Locations:
- British Library DSC - 3829.728200
British Library DSC - BLDSS-3PM
British Library HMNTS - ELD Digital store - Ingest File:
- 11395.xml