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contributor authorO. E. Jensen
contributor authorJ. R. Sachs
contributor authorJ. B. Grotberg
contributor authorM. R. Glucksberg
date accessioned2017-05-08T23:43:20Z
date available2017-05-08T23:43:20Z
date copyrightSeptember, 1994
date issued1994
identifier issn0021-8936
identifier otherJAMCAV-26357#729_1.pdf
identifier urihttp://yetl.yabesh.ir/yetl/handle/yetl/113092
description abstractUsing the biphasic theory of Biot (1941), we examine the evolution of deformations of a poroelastic layer, secured at its base to a rigid plane and having a stress-free, impermeable upper surface. By identifying a limit in which the layer is very thin but the wavelength of disturbances is very long, we show how nonlinear effects due to the finite slope of the free surface cause local elevations of the free surface to decay more slowly than depressions.
publisherThe American Society of Mechanical Engineers (ASME)
titleWeakly Nonlinear Deformation of a Thin Poroelastic Layer With a Free Surface
typeJournal Paper
journal volume61
journal issue3
journal titleJournal of Applied Mechanics
identifier doi10.1115/1.2901526
journal fristpage729
journal lastpage731
identifier eissn1528-9036
keywordsDeformation
keywordsWavelength
keywordsStress AND Elevations (Drawings)
treeJournal of Applied Mechanics:;1994:;volume( 061 ):;issue: 003
contenttypeFulltext


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