Heat conduction equation in physically inhomogeneous moving composite solids
Gasimov, G., Abusutash, Z. (2016). Heat conduction equation in physically inhomogeneous moving composite solids. EKB Journal Management System, 6(1), 1-8. doi: 10.21608/sjdfs.2016.194514
G. R. Gasimov; Z. A. Abusutash. "Heat conduction equation in physically inhomogeneous moving composite solids". EKB Journal Management System, 6, 1, 2016, 1-8. doi: 10.21608/sjdfs.2016.194514
Gasimov, G., Abusutash, Z. (2016). 'Heat conduction equation in physically inhomogeneous moving composite solids', EKB Journal Management System, 6(1), pp. 1-8. doi: 10.21608/sjdfs.2016.194514
Gasimov, G., Abusutash, Z. Heat conduction equation in physically inhomogeneous moving composite solids. EKB Journal Management System, 2016; 6(1): 1-8. doi: 10.21608/sjdfs.2016.194514

Heat conduction equation in physically inhomogeneous moving composite solids

Scientific Journal for Damietta Faculty of Science
Volume 6, Issue 1, June 2016, Page 1-8  XML PDF (1.26 MB)
Document Type: Original articles
DOI: 10.21608/sjdfs.2016.194514
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Authors
G. R. Gasimov1; Z. A. Abusutash email 2, 3
1Baku State University, Faculty of applied mathematics, Baku
2El-Mergeb University, Faculty of Science, Mathematics Department, Libya
3Department of Mathematics, Faculty of Science, Damietta University, Damietta 34517, Egypt
Abstract
This paper presents a heat conduction problem of inhomogeneous physically moving compound
bodies, which consists of two cylinders. Using a sequence of integral transformations(Laplace,
Hankel), the Cauchys residue theory, Bessel functions and using the results of the roots of one
transcendental equation, which results from the conditions of contact between the two cylinders, a
solution in the form of a series is obtained. A special case of alternating zeros of transcendental
equation is also given.
Keywords
A moving cylinder; Composite solids; Heat conduction problem
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