Ferrero, Daniela; Kalinowski, Thomas; Stephen, Sudeep

Author(s)

Ferrero, Daniela

Kalinowski, Thomas

Stephen, Sudeep

Publication Date

2019-02-28

Abstract

Zero forcing is a propagation process on a graph, or digraph, defined in linear algebra to provide a bound for the minimum rank problem. Independently, zero forcing was introduced in physics, computer science and network science, areas where line digraphs are frequently used as models. Zero forcing is also related to power domination, a propagation process that models the monitoring of electrical power networks. In this paper we study zero forcing in iterated line digraphs and provide a relationship between zero forcing and power domination in line digraphs. In particular, for regular iterated line digraphs we determine the minimum rank/maximum nullity, zero forcing number and power domination number, and provide constructions to attain them. We conclude that regular iterated line digraphs present optimal minimum rank/maximum nullity, zero forcing number and power domination number, and apply our results to determine those parameters on some families of digraphs often used in applications.

Citation

Discrete Applied Mathematics, v.255, p. 198-208

ISSN

1872-6771

0166-218X

Link

https://hdl.handle.net/1959.11/26427

Publisher

Elsevier BV, North-Holland

Title

Zero forcing in iterated line digraphs

Type of document

Journal Article

Entity Type

Publication

Author(s)	Ferrero, Daniela Kalinowski, Thomas Stephen, Sudeep
Publication Date	2019-02-28
Abstract	Zero forcing is a propagation process on a graph, or digraph, defined in linear algebra to provide a bound for the minimum rank problem. Independently, zero forcing was introduced in physics, computer science and network science, areas where line digraphs are frequently used as models. Zero forcing is also related to power domination, a propagation process that models the monitoring of electrical power networks. In this paper we study zero forcing in iterated line digraphs and provide a relationship between zero forcing and power domination in line digraphs. In particular, for regular iterated line digraphs we determine the minimum rank/maximum nullity, zero forcing number and power domination number, and provide constructions to attain them. We conclude that regular iterated line digraphs present optimal minimum rank/maximum nullity, zero forcing number and power domination number, and apply our results to determine those parameters on some families of digraphs often used in applications.
Citation	Discrete Applied Mathematics, v.255, p. 198-208
ISSN	1872-6771 0166-218X
Link	https://hdl.handle.net/1959.11/26427
Publisher	Elsevier BV, North-Holland
Title	Zero forcing in iterated line digraphs
Type of document	Journal Article
Entity Type	Publication

Zero forcing in iterated line digraphs

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