Building fences around the chromatic coefficients.

dc.contributor.advisorBreen, Marilyn,en_US
dc.contributor.authorStrickland, Debra Ann Mullins.en_US
dc.date.accessioned2013-08-16T12:29:30Z
dc.date.available2013-08-16T12:29:30Z
dc.date.issued1997en_US
dc.description.abstractAlthough these bounding conditions do not allow us to completely predict all chromatic polynomials, they do serve to severely limit the form of polynomials considered to be candidates for the chromatic polynomial of some graph.en_US
dc.description.abstractIn general it remains an unsolved problem to determine which polynomials are chromatic. The purpose of this paper is to establish controls over the allowable values and patterns in the coefficients of chromatic polynomials.en_US
dc.description.abstractAssociated to each graph G is its chromatic polynomial $f(G, t)$ and we associate to $f(G, t)$ the sequence $\alpha (G)$ of the norms of its coefficients. A stringent partial ordering is established for such sequences. First, we show that if H is a subgraph of G then $\alpha (H) \le \alpha (G).$ The main result is that for any graph G with q edges we have $\alpha (R\sb{q}) \le \alpha (G) \le (S\sb{q}), $ where $R\sb{q}$ and $S\sb{q}$ are specified graphs with q edges. It is also useful to examine the coefficient sequence $\beta (G)$ of a chromatic polynomial $f(G, t)$ which has been expressed in terms of falling factorials. If G has m missing edges we find that $\beta (T\sb{\bar m})\le \beta (G)\le \beta (X\sb{\bar m})$ where $T\sb{\bar m}$ and $X\sb{\bar m}$ are specified graphs with m missing edges.en_US
dc.format.extentvi, 46 leaves :en_US
dc.identifier.urihttp://hdl.handle.net/11244/5418
dc.noteSource: Dissertation Abstracts International, Volume: 57-11, Section: B, page: 6978.en_US
dc.noteAdviser: Marilyn Breen.en_US
dc.subjectFour-color problem.en_US
dc.subjectMathematics.en_US
dc.subjectPolynomials.en_US
dc.subjectGraph theory.en_US
dc.thesis.degreePh.D.en_US
dc.thesis.degreeDisciplineDepartment of Mathematicsen_US
dc.titleBuilding fences around the chromatic coefficients.en_US
dc.typeThesisen_US
ou.groupCollege of Arts and Sciences::Department of Mathematics
ou.identifier(UMI)AAI9712664en_US

Files

Original bundle
Now showing 1 - 1 of 1
Loading...
Thumbnail Image
Name:
9712664.PDF
Size:
976.55 KB
Format:
Adobe Portable Document Format