On the stability result of swelling porous-elastic soils with infinite memory
Adel M. Al‐Mahdi, Mohammad M. Al‐Gharabli, Tijani A. Apalara
Abstract
This paper aims to establish a general stability result for a one-dimensional linear swelling porous-elastic system with infinite memory, irrespective of the wave speeds of the system. The proof is based on the multiplier method and some properties of convex functions. The kernel in our memory term is more general and of a broader class. Our output extends and improves some of the available results on swelling porous media in the literature.
Topics & Concepts
SwellingMathematicsStability (learning theory)PorosityPorous mediumRegular polygonMathematical analysisClass (philosophy)Kernel (algebra)Applied mathematicsComposite materialMaterials sciencePure mathematicsGeometryComputer scienceMachine learningArtificial intelligenceAdvanced Mathematical Modeling in EngineeringStability and Controllability of Differential EquationsThermoelastic and Magnetoelastic Phenomena