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Портал Begell Электронная Бибилиотека e-Книги Журналы Справочники и Сборники статей Коллекции
Journal of Porous Media
Импакт фактор: 1.49 5-летний Импакт фактор: 1.159 SJR: 0.43 SNIP: 0.671 CiteScore™: 1.58

ISSN Печать: 1091-028X
ISSN Онлайн: 1934-0508

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Journal of Porous Media

DOI: 10.1615/JPorMedia.2018021438
pages 1025-1040


Manjeet Kumari
Department of Mathematics, Indira Gandhi University, Meerpur, India-122503
M. S. Barak
Department of Mathematics, Indira Gandhi University, Meerpur, India-122503
M. Kumar
Department of Mathematics, Dr. B. R. Ambedkar Govt. College, Dabwali, India-125104

Краткое описание

In the present problem the reflection of plane harmonic waves at the permeable (or impermeable) boundary of dissipative porous solid is investigated. Porous medium is dissipative in nature due to the viscosity of pores fluid. As a result of incident wave at the stress-free surface, it is found that three reflected waves exist in a dissipative porous solid. All the reflected waves are inhomogeneous in nature (i.e., dissimilar direction of propagation and attenuation). The segmentation of incident energy among versatile reflected waves at the stress-free surface is computed at both permeable and impermeable boundaries. Due to the dissipative nature of medium, conservation of net energy flux at the stress-free surface is prevailed in the mien of an interaction energy between two dissimilar waves. The essences of porosity, Poisson's ratio, viscoelasticity, pore characteristics, and wave frequency on various energy shares are depicted graphically and discussed.