Dynamical Systems Approach of Internal Length in Fractional Calculus

Dynamical Systems Approach of Internal Length in Fractional Calculus

Conventionally, non-local properties are included in the constitutive equations in the form of strain gradient-dependent terms. In case of the second gradient dependence an internal material length can be obtained from the critical eigenmodes in instability problems. When non-locality is included by...

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Bibliographic Details
Main Author:	Peter Balazs BEDA
Format:	Article
Language:	English
Published:	Institute of Fundamental Technological Research 2017-03-01
Series:	Engineering Transactions
Subjects:	rate and gradient dependence fractional calculus static and dynamic internal length
Online Access:	https://et.ippt.pan.pl/index.php/et/article/view/703
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