Fractional calculus is viewed as a novel and powerful tool to describe the stress and strain relations in viscoelastic materials. Consequently, the motions of engineering structures incorporated with viscoelastic dampers can be described by fractional-order differential equations. To deal with the fractional differential equations, initialization for fractional derivatives and integrals is considered to be a fundamental and unavoidable problem. However, this issue has been an open problem for a long time and controversy persists. The initialization function approach and the infinite state approach are two effective ways in initialization for fractional derivatives and integrals. By comparing the above two methods, this technical brief presents equivalence and unification of the Riemann–Liouville fractional integrals and the diffusive representation. First, the equivalence is proved in zero initialization case where both of the initialization function and the distributed initial condition are zero. Then, by means of initialized fractional integration, equivalence and unification in the case of arbitrary initialization are addressed. Connections between the initialization function and the distributed initial condition are derived. Besides, the infinite dimensional distributed initial condition is determined by means of input function during historic period.
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March 2018
Technical Briefs
Equivalence of Initialized Fractional Integrals and the Diffusive Model
Jian Yuan,
Jian Yuan
Institute of System Science and Mathematics,
Naval Aeronautical and Astronautical University,
Yantai 264001, China
e-mail: yuanjianscar@gmail.com
Naval Aeronautical and Astronautical University,
Yantai 264001, China
e-mail: yuanjianscar@gmail.com
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Jingmao Liu,
Jingmao Liu
Shandong Nanshan International Flight Co., Ltd.,
Yantai 265713, China
e-mail: liujingmao@nanshan.com.cn
Yantai 265713, China
e-mail: liujingmao@nanshan.com.cn
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Bao Shi
Bao Shi
Institute of System Science and Mathematics,
Naval Aeronautical and Astronautical University,
Yantai 264001, China
e-mail: baoshi781@sohu.com
Naval Aeronautical and Astronautical University,
Yantai 264001, China
e-mail: baoshi781@sohu.com
Search for other works by this author on:
Jian Yuan
Institute of System Science and Mathematics,
Naval Aeronautical and Astronautical University,
Yantai 264001, China
e-mail: yuanjianscar@gmail.com
Naval Aeronautical and Astronautical University,
Yantai 264001, China
e-mail: yuanjianscar@gmail.com
Youan Zhang
Jingmao Liu
Shandong Nanshan International Flight Co., Ltd.,
Yantai 265713, China
e-mail: liujingmao@nanshan.com.cn
Yantai 265713, China
e-mail: liujingmao@nanshan.com.cn
Bao Shi
Institute of System Science and Mathematics,
Naval Aeronautical and Astronautical University,
Yantai 264001, China
e-mail: baoshi781@sohu.com
Naval Aeronautical and Astronautical University,
Yantai 264001, China
e-mail: baoshi781@sohu.com
Contributed by the Design Engineering Division of ASME for publication in the JOURNAL OF COMPUTATIONAL AND NONLINEAR DYNAMICS. Manuscript received June 5, 2017; final manuscript received December 10, 2017; published online January 10, 2018. Assoc. Editor: Dumitru Baleanu.
J. Comput. Nonlinear Dynam. Mar 2018, 13(3): 034501 (4 pages)
Published Online: January 10, 2018
Article history
Received:
June 5, 2017
Revised:
December 10, 2017
Citation
Yuan, J., Zhang, Y., Liu, J., and Shi, B. (January 10, 2018). "Equivalence of Initialized Fractional Integrals and the Diffusive Model." ASME. J. Comput. Nonlinear Dynam. March 2018; 13(3): 034501. https://doi.org/10.1115/1.4038777
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