Constrained Graph Searching on Trees

Research output: Chapters, Conference Papers, Creative and Literary WorksRGC 32 - Refereed conference paper (with host publication)peer-review

View graph of relations

Author(s)

Detail(s)

Original languageEnglish
Title of host publicationFrontiers of Algorithmics - 17th International Joint Conference, IJTCS-FAW 2023, Proceedings
EditorsMinming Li, Xiaoming Sun, Xiaowei Wu
PublisherSpringer, Cham
Pages239-251
ISBN (electronic)9783031393440
ISBN (print)9783031393433
Publication statusPublished - 2023

Publication series

NameLecture Notes in Computer Science
Volume13933
ISSN (Print)0302-9743
ISSN (electronic)1611-3349

Conference

Title17th International Joint Conference on Theoretical Computer Science - Frontier of Algorithmic Wisdom (IJTCS-FAW 2023)
PlaceChina
CityMacau
Period14 - 18 August 2023

Abstract

Megiddo et al. (1988) introduced the edge searching problem, which is to find the minimum number of searchers to capture the robber in the edge searching model. Dyer et al. (2008) introduced the fast searching problem that is to find the minimum number of searchers to capture the robber in the fast searching model. In this paper, we consider these two graph searching problems under some constraints. One constraint is that a subset of vertices, called start vertices, are initially occupied by searchers before we place additional searchers on the graph. Another constraint is that some of the searchers must end their search at certain vertices called halt vertices. We focus on trees with n vertices. Let k be the number of times to move searchers from start vertices. For the edge searching problem, we give an O(kn)-time algorithm for computing the edge search number of a tree that contains only start vertices or only halt vertices. For a tree that contains both start vertices and halt vertices, we present an O(n2)-time algorithm to compute the edge search number. We show that all these problems are monotonic. For the fast searching problem, we propose a linear-time algorithm for computing the fast search number of a tree that contains only start vertices or only halt vertices. For a tree with n vertices that contains s start vertices and h halt vertices, we give an O((+ h)n)-time algorithm to compute the fast search number. © 2023, Springer Nature Switzerland AG.

Research Area(s)

  • edge search number, fast search number, graph searching, tree

Citation Format(s)

Constrained Graph Searching on Trees. / Wang, Lusheng; Yang, Boting; Zhan, Zhaohui.
Frontiers of Algorithmics - 17th International Joint Conference, IJTCS-FAW 2023, Proceedings. ed. / Minming Li; Xiaoming Sun; Xiaowei Wu. Springer, Cham, 2023. p. 239-251 (Lecture Notes in Computer Science; Vol. 13933).

Research output: Chapters, Conference Papers, Creative and Literary WorksRGC 32 - Refereed conference paper (with host publication)peer-review