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个人信息Personal Information
教授
博士生导师
硕士生导师
性别:男
毕业院校:大连理工大学
学位:博士
所在单位:力学与航空航天学院
学科:固体力学. 计算力学. 工程力学
办公地点:综合实验1号楼523
联系方式:qgao@dlut.edu.cn
电子邮箱:qgao@dlut.edu.cn
Expectation-based approach for one-dimensional randomly disordered phononic crystals
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论文类型:期刊论文
发表时间:2014-03-14
发表刊物:PHYSICS LETTERS A
收录刊物:SCIE、Scopus
卷号:378
期号:16-17
页面范围:1043-1048
ISSN号:0375-9601
关键字:Randomly disordered; Phononic crystal; Transfer matrix; Eigenstate; Expectation; Bloch theorem
摘要:An expectation-based approach to the statistical theorem is proposed for the one-dimensional randomly disordered phononic crystal. In the proposed approach, the expectations of the random eigenstates of randomly disordered phononic crystals are investigated. In terms of the expectations of the random eigenstates, the wave propagation and localization phenomenon in the random phononic crystal could be understood in a statistical perspective. Using the proposed approach, it is proved that for a randomly disordered phononic crystal, the Bloch theorem holds in the perspective of expectation. A one-dimensional randomly disordered binary phononic crystal consisting of two materials with the random geometry size or random physical parameter is addressed by using the proposed approach. From the result, it can be observed that with the increase of the disorder degree, the localization of the expectations of the eigenstates is strengthened. The effect of the random disorder on the eigenstates at higher frequencies is more significant than that at lower frequencies. Furthermore, after introducing the random disorder into phononic crystals, some random divergent eigenstates are changed to localized eigenstates in expectation sense. (C) 2014 Elsevier B.V. All rights reserved.