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A key distribution technique for wireless sensor networks using spanning trees.

Authors :
Rysz, Maciej
Semenov, Alexander
Source :
Expert Systems with Applications. Dec2024, Vol. 257, pN.PAG-N.PAG. 1p.
Publication Year :
2024

Abstract

Protocols for encrypting communications in wireless sensor networks have rarely been addressed from a classical network optimization perspective. An underlying procedure of such protocols, known as key distribution , involves assigning cryptographic keys to sensors, which are then used to encrypt and decrypt transmitted data. In context of maximizing communications security objectives, the combinatorial nature of assigning keys to sensors with limited memory capacities exhibits properties conducive to developing methods for finding optimal key distributions. This work focuses on the q -Composite key distribution/assignment protocol, which requires that two sensors share at least q common keys to securely exchange data. As a means of reducing the likelihood of large-scale information breaches if a small number of keys are compromised, a security objective of maximizing the number of non-redundant (unique) keys assigned to the sensors is considered. It is demonstrated that node (sensor) degrees in a spanning tree, along with their memory capacities, can be used to exactly determine the maximum possible number of non-redundant keys assigned. Leveraging on these properties, our method reduces the problem of assigning a maximum number of keys to that of finding a degree-bounded spanning tree in a network. A polynomial time solution algorithm along with a linear time algorithm for assigning a maximum number of unique keys is introduced. Broadly, the proposed method provides a novel approach for designing, analyzing, or identifying secure key distributions in large-scale networks by using properties of the underlying graphs. • Introduce a graph-based method for finding network encryption strategies. • Efficient algorithm that guarantees a maximum cryptographic key distribution. • There exist cases of key distribution problems that reduce to finding spanning trees. [ABSTRACT FROM AUTHOR]

Details

Language :
English
ISSN :
09574174
Volume :
257
Database :
Academic Search Index
Journal :
Expert Systems with Applications
Publication Type :
Academic Journal
Accession number :
179507029
Full Text :
https://doi.org/10.1016/j.eswa.2024.124997