1403/01/10
دوستعلی مژده

دوستعلی مژده

مرتبه علمی: استاد
ارکید:
تحصیلات: دکترای تخصصی
اسکاپوس:
دانشکده: دانشکده علوم ریاضی
نشانی:
تلفن: 011-35302448

مشخصات پژوهش

عنوان
VARIOUS BOUNDS FOR LIAR’S DOMINATION NUMBER
نوع پژوهش
JournalPaper
کلیدواژه‌ها
liar’s domination, diameter, regular graph, Nordhaus-Gaddum.
سال
2016
مجله Discussiones Mathematicae Graph Theory
شناسه DOI
پژوهشگران Doost Ali Mojdeh ، Abdollah Alimadadi ، Nader Jafari Rad

چکیده

Let G = (V,E) be a graph. A set S ⊆ V is a dominating set if S v2S N[v] = V , where N[v] is the closed neighborhood of v. Let L ⊆ V be a dominating set, and let v be a designated vertex in V (an intruder vertex). Each vertex in L ∩ N[v] can report that v is the location of the intruder, but (at most) one x ∈ L ∩ N[v] can report any w ∈ N[x] as the intruder location or x can indicate that there is no intruder in N[x]. A dominating set L is called a liar’s dominating set if every v ∈ V (G) can be correctly identified as an intruder location under these restrictions. The minimum cardinality of a liar’s dominating set is called the liar’s domination number, and is denoted by LR(G). In this paper, we present sharp bounds for the liar’s domination number in terms of the diameter, the girth and clique covering number of a graph. We present two Nordhaus-Gaddum type relations for LR(G), and study liar’s dominating set sensitivity versus edge-connectivity. We also present various bounds for the liar’s domination component number, that is, the maximum number of components over all minimum liar’s dominating sets.