First of all we formulate a very general boundary initial value problem for the dynamics of a linear isotropic viscoelastic porous solid saturated with an inviscid and incompressible fluid. Then we establish a uniqueness theorem for a significative subclass of such continua. This theorem holds for bounded and unbounded domains and in the latter case we do not impose artificial conditions on the behaviour of the unknown fields at infinity. © 1985 Società Italiana di Fisica.

Uniqueness in boundary initial value problems for a viscoelastic porous solid saturated with a fluid

BORRELLI, Alessandra;PATRIA, Maria Cristina
1985

Abstract

First of all we formulate a very general boundary initial value problem for the dynamics of a linear isotropic viscoelastic porous solid saturated with an inviscid and incompressible fluid. Then we establish a uniqueness theorem for a significative subclass of such continua. This theorem holds for bounded and unbounded domains and in the latter case we do not impose artificial conditions on the behaviour of the unknown fields at infinity. © 1985 Società Italiana di Fisica.
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Utilizza questo identificativo per citare o creare un link a questo documento: https://hdl.handle.net/11392/1398476
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