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16 results on '"De Silva, Jessica"'

1. Very Well-Covered Graphs with the Erd\H{o}s-Ko-Rado Property

Author

De Silva, Jessica, Dionne, Adam B., Dunkelberg, Aidan, and Harris, Pamela E.

Subjects
Mathematics - Combinatorics, 05C35
Abstract

A family of independent $r$-sets of a graph $G$ is an $r$-star if every set in the family contains some fixed vertex $v$. A graph is $r$-EKR if the maximum size of an intersecting family of independent $r$-sets is the size of an $r$-star. Holroyd and Talbot conjecture that a graph is $r$-EKR as long as $1\leq r\leq\frac{\mu(G)}{2}$, where $\mu(G)$ is the minimum size of a maximal independent set. It is suspected that the smallest counterexample to this conjecture is a well-covered graph. Here we consider the class of very well-covered graphs $G^*$ obtained by appending a single pendant edge to each vertex of $G$. We prove that the pendant complete graph $K_n^*$ is $r$-EKR when $n \geq 2r$ and strictly so when $n>2r$. Pendant path graphs $P_n^*$ are also explored and the vertex whose $r$-star is of maximum size is determined., Comment: 10 pages

Published
2021
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2. An analysis of a fair division protocol for drawing legislative districts

Author

De Silva, Jessica, Gales, Brady, Kagy, Bryson, and Offner, David

Subjects
Mathematics - Combinatorics
Abstract

Landau, Reid, and Yershov [A Fair Division Solution to the Problem of Redistricting, \textit{Social Choice and Welfare}, 2008] propose a protocol for drawing legislative districts based on a two player fair division process, where each player is entitled to draw the districts for a portion of the state. We call this the \textit{LRY protocol}. Landau and Su [Fair Division and Redistricting, arXiv:1402.0862, 2014] propose a measure of the fairness of a state's districts called the \textit{geometric target}. In this paper we prove that the number of districts a party can win under the LRY protocol can be at most two fewer than their geometric target, assuming no geometric constraints on the districts, and provide examples to prove this bound is tight. We also show that if the LRY protocol is applied on a state with geometric constraints, the result can be arbitrarily far from the geometric target.

Published
2018

3. Anti-Ramsey Multiplicities

Author

De Silva, Jessica, Si, Xiang, Tait, Michael, Tunçbilek, Yunus, Yang, Ruifan, and Young, Michael

Subjects
Mathematics - Combinatorics, 05C15, 05D10, 05A16
Abstract

The Ramsey multiplicity constant of a graph $H$ is the minimum proportion of copies of $H$ in the complete graph which are monochromatic under an edge-coloring of $K_n$ as $n$ goes to infinity. Graphs for which this minimum is asymptotically achieved by taking a random coloring are called {\em common}, and common graphs have been studied extensively, leading to the Burr-Rosta conjecture and Sidorenko's conjecture. Erd\H{o}s and S\'os asked what the maximum number of rainbow triangles is in a $3$-coloring of the edge set of $K_n$, a rainbow version of the Ramsey multiplicity question. A graph $H$ is called $r$-anti-common if the maximum proportion of rainbow copies of $H$ in any $r$-coloring of $E(K_n)$ is asymptotically achieved by taking a random coloring. In this paper, we investigate anti-Ramsey multiplicity for several families of graphs. We determine classes of graphs which are either anti-common or not. Some of these classes follow the same behavior as the monochromatic case, but some of them do not. In particular the rainbow equivalent of Sidorenko's conjecture, that all bipartite graphs are anti-common, is false., Comment: 14 pages, 2 figures

Published
2018

4. Tur\'an numbers of vertex-disjoint cliques in $r$-partite graphs

Author

De Silva, Jessica, Heysse, Kristin, Kapilow, Adam, Schenfisch, Anna, and Young, Michael

Subjects
Mathematics - Combinatorics
Abstract

For two graphs $G$ and $H$, the Tur\'{a}n number $ex(G,H)$ is the maximum number of edges in a subgraph of $G$ that contains no copy of $H$. Chen, Li, and Tu determined the Tur\'{a}n numbers $ex(K_{m,n},kK_2)$ for all $k\geq 1$ [7]. In this paper we will determine the Tur\'{a}n numbers $ex(K_{a_1,\ldots,a_r},kK_r)$ for all $r\geq 3$ and $k\geq 1$.

Published
2016

5. On the distance spectra of graphs

Author

Aalipour, Ghodratollah, Abiad, Aida, Berikkyzy, Zhanar, Cummings, Jay, De Silva, Jessica, Gao, Wei, Heysse, Kristin, Hogben, Leslie, Kenter, Franklin H. J., Lin, Jephian C. -H., and Tait, Michael

Subjects
Mathematics - Combinatorics, 05C12, 05C31, 05C50, 15A15, 15A18, 15B48, 15B57
Abstract

The distance matrix of a graph $G$ is the matrix containing the pairwise distances between vertices. The distance eigenvalues of $G$ are the eigenvalues of its distance matrix and they form the distance spectrum of $G$. We determine the distance spectra of halved cubes, double odd graphs, and Doob graphs, completing the determination of distance spectra of distance regular graphs having exactly one positive distance eigenvalue. We characterize strongly regular graphs having more positive than negative distance eigenvalues. We give examples of graphs with few distinct distance eigenvalues but lacking regularity properties. We also determine the determinant and inertia of the distance matrices of lollipop and barbell graphs., Comment: 20 pages, 3 figures v2. updated acknowledgements

Published
2015

6. Increasing paths in edge-ordered graphs: the hypercube and random graphs

Author

De Silva, Jessica, Molla, Theodore, Pfender, Florian, Retter, Troy, and Tait, Michael

Subjects
Mathematics - Combinatorics
Abstract

An edge-ordering of a graph $G=(V,E)$ is a bijection $\phi:E\to\{1,2,...,|E|\}$. Given an edge-ordering, a sequence of edges $P=e_1,e_2,...,e_k$ is an increasing path if it is a path in $G$ which satisfies $\phi(e_i)<\phi(e_j)$ for all $i

Published
2015

7. The combinatorics of interval-vector polytopes

Author

Beck, Matthias, De Silva, Jessica, Dorfsman-Hopkins, Gabriel, Pruitt, Joseph, and Ruiz, Amanda

Subjects
Mathematics - Combinatorics, 52B05, 05A15, 52B20
Abstract

An \emph{interval vector} is a $(0,1)$-vector in $\mathbb{R}^n$ for which all the 1's appear consecutively, and an \emph{interval-vector polytope} is the convex hull of a set of interval vectors in $\mathbb{R}^n$. We study three particular classes of interval vector polytopes which exhibit interesting geometric-combinatorial structures; e.g., one class has volumes equal to the Catalan numbers, whereas another class has face numbers given by the Pascal 3-triangle., Comment: 10 pages, 3 figures

Published
2012

9. On the distance spectra of graphs

Author

Aalipour, Ghodratollah, Abiad, Aida, Berikkyzy, Zhanar, Cummings, Jay, De Silva, Jessica, Gao, Wei, Heysse, Kristin, Hogben, Leslie, Kenter, Franklin H.J., Lin, Jephian C.-H., and Tait, Michael

Published
2016
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10. Graphs with Few Spanning Substructures

Author

De Silva, Jessica C and De Silva, Jessica C

Abstract

In this thesis, we investigate a number of problems related to spanning substructures of graphs. The first few chapters consider extremal problems related to the number of forest-like structures of a graph. We prove that one can find a threshold graph which contains the minimum number of spanning pseudoforests, as well as rooted spanning forests, amongst all graphs on n vertices and e edges. This has left the open question of exactly which threshold graphs have the minimum number of these spanning substructures. We make progress towards this question in particular cases of spanning pseudoforests. The final chapter takes on a different flavor—we determine the complexity of a problem related to Hamilton cycles in hypergraphs. Dirac's theorem states that graphs with minimum degree at least half the size of the vertex set are guaranteed to have a Hamilton cycle. In 1993, Karpinksi, Dahlhaus, and Hajnal proved that for any c < ½, the problem of determining whether a graph with minimum degree at least cn has a Hamilton cycle is NP-complete. The analogous problem in hypergraphs, for both a Dirac-type condition and complexity, are just as interesting. We prove that for classes of hypergraphs with certain minimum vertex degree conditions, the problem of determining whether or not they contain an l-Hamilton cycle is NP-complete.

Published
2018

14. Turán numbers of vertex-disjoint cliques in [formula omitted]-partite graphs.

Author

De Silva, Jessica, Heysse, Kristin, Kapilow, Adam, Schenfisch, Anna, and Young, Michael

Subjects
*NUMBER theory, *GEOMETRIC vertices, *MATHEMATICAL functions, *GRAPH theory, *MATHEMATICAL formulas
Abstract

For two graphs G and H , the Turán number ex ( G , H ) is the maximum number of edges in a subgraph of G that contains no copy of H . Chen, Li, and Tu determined the Turán numbers ex ( K m , n , k K 2 ) for all k ≥ 1 Chen et al. (2009). In this paper we will determine the Turán numbers ex ( K a 1 , … , a r , k K r ) for all r ≥ 3 and k ≥ 1 . [ABSTRACT FROM AUTHOR]

Published
2018
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16. Graphs with few spanning substructures

Author

De Silva, Jessica

Subjects
pseudoforests, hamilton cycles, spanning, Discrete Mathematics and Combinatorics
Abstract

In this thesis, we investigate a number of problems related to spanning substructures of graphs. The first few chapters consider extremal problems related to the number of forest-like structures of a graph. We prove that one can find a threshold graph which contains the minimum number of spanning pseudoforests, as well as rooted spanning forests, amongst all graphs on n vertices and e edges. This has left the open question of exactly which threshold graphs have the minimum number of these spanning substructures. We make progress towards this question in particular cases of spanning pseudoforests. The final chapter takes on a different flavor---we determine the complexity of a problem related to Hamilton cycles in hypergraphs. Dirac's theorem states that graphs with minimum degree at least half the size of the vertex set are guaranteed to have a Hamilton cycle. In 1993, Karpinksi, Dahlhaus, and Hajnal proved that for any c Advisor: Professor Jamie Radcliffe

Published
2018

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