Abstract
Given a graph G with a ranking function, f: V(G) --> {1,2,...,k}, the ranking is minimal if only if G does not contain a drop vertex. The arank number of a graph, [psi]r(G), is the maximum k such that G has a minimal k-ranking. A new technique is established to better understand how to analyze arankings of various cyclic graphs, Cn. Then the technique, flanking number, is used to describe all arank properties of all cyclic graphs fully by proving the following proposition: [psi]r(C_n) = [floor]{log₂(n+1)[floor] + [floor]log₂(n+2/3)[floor] + 1 for all n > 6.
Library of Congress Subject Headings
Graph theory
Publication Date
5-13-2011
Document Type
Thesis
Department, Program, or Center
School of Mathematical Sciences (COS)
Advisor
Narayan, Darren
Recommended Citation
Short, M. Daniel, "Flanking numbers and its application to arankings of cyclic graphs" (2011). Thesis. Rochester Institute of Technology. Accessed from
https://repository.rit.edu/theses/4996
Campus
RIT – Main Campus
Comments
Note: imported from RIT’s Digital Media Library running on DSpace to RIT Scholar Works. Physical copy available through RIT's The Wallace Library at: QA166 .S467 2011