Ann N. Trenk scite author profile

In this paper we define and study the distinguishing chromatic number, $\chi_D(G)$, of a graph $G$, building on the work of Albertson and Collins who studied the distinguishing number. We find $\chi_D(G)$ for various families of graphs and characterize those graphs with $\chi_D(G)$ $ = |V(G)|$, and those trees with the maximum chromatic distingushing number for trees. We prove analogs of Brooks' Theorem for both the distinguishing number and the distinguishing chromatic number, and for both trees and connected graphs. We conclude with some conjectures.

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Dot product representations of graphs

Fiduccia¹,

Scheinerman

Trenk

et al. 1998

Discrete Mathematics

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Stack and Queue Layouts of Directed Acyclic Graphs: Part I

Heath¹,

Pemmaraju²,

Trenk³

1999

SIAM J. Comput.

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Stack layouts and queue layouts of undirected graphs have been used to model problems in fault tolerant computing and in parallel process scheduling. However, problems in parallel process scheduling are more accurately modeled by stack and queue layouts of directed acyclic graphs (dags). A stack layout of a dag is similar to a stack layout of an undirected graph, with the additional requirement that the nodes of the dag be in some topological order. A queue layout is de ned in an analogous manner. The stacknumber (queuenumber) of a dag is the smallest number of stacks (queues) required for its stack layout (queue layout). In this paper, bounds are established on the stacknumber and queuenumber of two classes of dags: tree dags and unicyclic dags. In particular, any tree dag can be laid out in 1 stack and in at most 2 queues; and any unicyclic dag can be laid out in at most 2 stacks and in at most 2 queues. Forbidden subgraph characterizations of 1-queue tree dags and 1queue cycle dags are also presented. Part II of this paper presents algorithmic results|in particular, linear time algorithms for recognizing 1-stack dags and 1-queue dags and proof of NP-completeness for the problem of recognizing a 4-queue dag and the problem of recognizing a 9-stack dag.

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Tolerance Graphs

Golumbic

Trenk

2004

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Bipartite tolerance orders

Bogart

Trenk

1994

Discrete Mathematics

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Ann N. Trenk

The Distinguishing Chromatic Number

Dot product representations of graphs

Stack and Queue Layouts of Directed Acyclic Graphs: Part I

Tolerance Graphs

Bipartite tolerance orders

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