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What is the shape of a bundle? An analysis of Rosen's fibrous composites experiments using the chain‐of‐bundles model
Author(s) -
Li Shuang,
Gleaton James,
Lynch James
Publication year - 2019
Publication title -
scandinavian journal of statistics
Language(s) - English
Resource type - Journals
SCImago Journal Rank - 1.359
H-Index - 65
eISSN - 1467-9469
pISSN - 0303-6898
DOI - 10.1111/sjos.12338
Subject(s) - bundle , fiber bundle , load sharing , mathematics , measure (data warehouse) , grid , partition (number theory) , chain (unit) , partition function (quantum field theory) , topology (electrical circuits) , composite material , geometry , computer science , combinatorics , materials science , parallel computing , data mining , physics , astronomy , quantum mechanics
In the 1960s, W. B. Rosen conducted some remarkable experiments on unidirectional fibrous composites that gave seminal insights into their failure under increasing tensile load. These insights led him to a grid system where the nodes in the grid were ineffective length fibers and to model the composite as something he called a chain ‐ of ‐ bundles model (i.e., a series system of parallel subsystems of horizontal nodes that he referred to as bundles), where the chain fails when one of the bundles fails. A load‐sharing rule was used to quantify how the load is borne among the nodes. Here, Rosen's experiments are analyzed to determine the shape of a bundle. The analysis suggests that the bundles are not horizontal collection of nodes but rather small rectangular grid systems of nodes where the load‐sharing between nodes is local in its form. In addition, a Gibbs measure representation for the joint distribution of binary random variables is given. This is used to show how the system reliability for a reliability structure can be obtained from the partition function for the Gibbs measure and to illustrate how to assess the risk of failure of a bundle in the chain‐of‐bundle model.