Global ETD Search

91	On the chromatic number of the <em>AO</em>(2, <em>k </em>, <em>k</em>-1) graphs. Arora, Navya 06 May 2006 (has links) The alphabet overlap graph is a modification of the well known de Bruijn graph. De Bruijn graphs have been highly studied and hence many properties of these graphs have been determined. However, very little is known about alphabet overlap graphs. In this work we determine the chromatic number for a special case of these graphs. We define the alphabet overlap graph by G = AO(a, k, t, where a, k and t are positive integers such that 0 ≤ t ≤ k. The vertex set of G is the set of all k-letter sequences over an alphabet of size a. Also there is an edge between vertices u, v if and only if the last t letters in u match the first t letters in v or the first t letters in u match the last t letters in v. We consider the chromatic number for the AO(a, k, t graphs when k > 2, t = k - 1 and a = 2. de Bruijn graph chromatic number Discrete Mathematics and Combinatorics Mathematics Physical Sciences and Mathematics
92	Very Cost Effective Partitions in Graphs Vasylieva, Inna 01 May 2013 (has links) For a graph G=(V,E) and a set of vertices S, a vertex v in S is said to be very cost effective if it is adjacent to more vertices in V -S than in S. A bipartition pi={S, V- S} is called very cost effective if both S and V- S are very cost effective sets. Not all graphs have a very cost effective bipartition, for example, the complete graphs of odd order do not. We consider several families of graphs G, including Cartesian products and cacti graphs, to determine whether G has a very cost effective bipartition. very cost effective partition Cartesian product cactus graph Discrete Mathematics and Combinatorics Mathematics
93	The Apprentices' Tower of Hanoi Ball, Cory BH 01 May 2015 (has links) The Apprentices' Tower of Hanoi is introduced in this thesis. Several bounds are found in regards to optimal algorithms which solve the puzzle. Graph theoretic properties of the associated state graphs are explored. A brief summary of other Tower of Hanoi variants is also presented. graph theory combinatorics Tower of Hanoi Hanoi variant puzzle Discrete Mathematics and Combinatorics Other Mathematics Theory and Algorithms
94	Global Supply Sets in Graphs Moore, Christian G 01 May 2016 (has links) For a graph G=(V,E), a set S⊆V is a global supply set if every vertex v∈V\S has at least one neighbor, say u, in S such that u has at least as many neighbors in S as v has in V \S. The global supply number is the minimum cardinality of a global supply set, denoted γgs (G). We introduce global supply sets and determine the global supply number for selected families of graphs. Also, we give bounds on the global supply number for general graphs, trees, and grid graphs. graph theory supply sets global supply sets Discrete Mathematics and Combinatorics Mathematics
95	Covering Arrays for Equivalence Classes of Words Cassels, Joshua, Godbole, Anant 01 May 2018 (has links) Covering arrays for words of length t over a d letter alphabet are k × n arrays with entries from the alphabet so that for each choice of t columns, each of the dt t-letter words appears at least once among the rows of the selected columns. We study two schemes in which all words are not considered to be different. In the first case, words are equivalent if they induce the same partition of a t element set. In the second case, words of the same weighted sum are equivalent. In both cases we produce logarithmic upper bounds on the minimum size k = k(n) of a covering array. Most definitive results are for t = 2, 3, 4. combinatorics permutation permutations partition partitions covering arrays array Discrete Mathematics and Combinatorics Mathematics
96	Properties of Functionally Alexandroff Topologies and Their Lattice Menix, Jacob Scott 01 July 2019 (has links) This thesis explores functionally Alexandroff topologies and the order theory asso- ciated when considering the collection of such topologies on some set X. We present several theorems about the properties of these topologies as well as their partially ordered set. The first chapter introduces functionally Alexandroff topologies and motivates why this work is of interest to topologists. This chapter explains the historical context of this relatively new type of topology and how this work relates to previous work in topology. Chapter 2 presents several theorems describing properties of functionally Alexandroff topologies ad presents a characterization for the functionally Alexandroff topologies on a finite set X. The third and fourth chapters present facts about the lattice of functionally Alexandroff topologies, with Chapter 4 being dedicated to an algorithm which generates a complement in this lattice. Mathematics order theory topology Discrete Mathematics and Combinatorics Geometry and Topology Set Theory
97	Interval Graphs Yang, Joyce C 01 January 2016 (has links) We examine the problem of counting interval graphs. We answer the question posed by Hanlon, of whether the formal power series generating function of the number of interval graphs on n vertices has a positive radius of convergence. We have found that it is zero. We have obtained a lower bound and an upper bound on the number of interval graphs on n vertices. We also study the application of interval graphs to the dynamic storage allocation problem. Dynamic storage allocation has been shown to be NP-complete by Stockmeyer. Coloring interval graphs on-line has applications to dynamic storage allocation. The most colors used by Kierstead's algorithm is 3 ω -2, where ω is the size of the largest clique in the graph. We determine a lower bound on the colors used. One such lower bound is 2 ω -1. 05A16 Asymptotic enumeration 05C30 Enumeration in graph theory 05C85 Graph algorithms Discrete Mathematics and Combinatorics
98	Graph Cohomology Lin, Matthew 01 January 2016 (has links) What is the cohomology of a graph? Cohomology is a topological invariant and encodes such information as genus and euler characteristic. Graphs are combinatorial objects which may not a priori admit a natural and isomorphism invariant cohomology ring. In this project, given any finite graph G, we constructively define a cohomology ring H*(G) of G. Our method uses graph associahedra and toric varieties. Given a graph, there is a canonically associated convex polytope, called the graph associahedron, constructed from G. In turn, a convex polytope uniquely determines a toric variety. We synthesize these results, and describe the cohomology of the associated variety directly in terms of the graph G itself. 05C99 Graph theory 05E99 Algebraic combinatorics 14M25 Toric varieties Algebra Discrete Mathematics and Combinatorics
99	Combinatorial Polynomial Hirsch Conjecture Miller, Sam 01 January 2017 (has links) The Hirsch Conjecture states that for a d-dimensional polytope with n facets, the diameter of the graph of the polytope is at most n-d. This conjecture was disproven in 2010 by Francisco Santos Leal. However, a polynomial bound in n and d on the diameter of a polytope may still exist. Finding a polynomial bound would provide a worst-case scenario runtime for the Simplex Method of Linear Programming. However working only with polytopes in higher dimensions can prove challenging, so other approaches are welcome. There are many equivalent formulations of the Hirsch Conjecture, one of which is the Combinatorial Polynomial Hirsch Conjecture, which turns the problem into a matter of counting sets. This thesis explores the Combinatorial Polynomial Hirsch Conjecture. hirsch conjecture combinatorics sets bounds polynomial Discrete Mathematics and Combinatorics Other Mathematics Set Theory Theory and Algorithms
100	An Incidence Approach to the Distinct Distances Problem McLaughlin, Bryce 01 January 2018 (has links) In 1946, Erdös posed the distinct distances problem, which asks for the minimum number of distinct distances that any set of n points in the real plane must realize. Erdös showed that any point set must realize at least &Omega(n1/2) distances, but could only provide a construction which offered &Omega(n/&radic(log(n)))$ distances. He conjectured that the actual minimum number of distances was &Omega(n1-&epsilon) for any &epsilon > 0, but that sublinear constructions were possible. This lower bound has been improved over the years, but Erdös' conjecture seemed to hold until in 2010 Larry Guth and Nets Hawk Katz used an incidence theory approach to show any point set must realize at least &Omega(n/log(n)) distances. In this thesis we will explore how incidence theory played a roll in this process and expand upon recent work by Adam Sheffer and Cosmin Pohoata, using geometric incidences to achieve bounds on the bipartite variant of this problem. A consequence of our extensions on their work is that the theoretical upper bound on the original distinct distances problem of &Omega(n/&radic(log(n))) holds for any point set which is structured such that half of the n points lies on an algebraic curve of arbitrary degree. 52C10 Algebraic Geometry Discrete Mathematics and Combinatorics

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