General fractional derivatives with applications in viscoelasticity

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Bibliographic Details
Author / Creator:Yang, Xiao-Jun (Mathematician)
Imprint:London : Academic Press, 2020.
Description:1 online resource
Language:English
Subject:
Format: E-Resource Book
URL for this record:http://pi.lib.uchicago.edu/1001/cat/bib/12284286
Hidden Bibliographic Details
Other authors / contributors:Gao, Feng.
Yang, Ju.
ISBN:9780128172094
0128172096
9780128172087
0128172088
Notes:Includes bibliographical references and index.
Other form:Original 0128172088 9780128172087
Description
Summary:General Fractional Derivatives with Applications in Viscoelasticity introduces the newly established fractional-order calculus operators involving singular and non-singular kernels with applications to fractional-order viscoelastic models from the calculus operator viewpoint. Fractional calculus and its applications have gained considerable popularity and importance because of their applicability to many seemingly diverse and widespread fields in science and engineering. Many operations in physics and engineering can be defined accurately by using fractional derivatives to model complex phenomena. Viscoelasticity is chief among them, as the general fractional calculus approach to viscoelasticity has evolved as an empirical method of describing the properties of viscoelastic materials. General Fractional Derivatives with Applications in Viscoelasticity makes a concise presentation of general fractional calculus.- Presents a comprehensive overview of the fractional derivatives and their applications in viscoelasticity- Provides help in handling the power-law functions- Introduces and explores the questions about general fractional derivatives and its applications
Physical Description:1 online resource
Bibliography:Includes bibliographical references and index.
ISBN:9780128172094
0128172096
9780128172087
0128172088