Litcius/Paper detail

An Eigenvalues Approach for a Two-Dimensional Porous Medium Based Upon Weak, Normal and Strong Thermal Conductivities

Faris Alzahrani, Aatef Hobiny, Ibrahim A. Abbas, Marín Marín

2020Symmetry133 citationsDOIOpen Access PDF

Abstract

This work is devoted to the investigation of a two-dimensional porous material under weak, strong and normal conductivity, using the eigenvalues method. By using Laplace–Fourier transformations with the eigenvalues technique, the variables are analytically obtained. The derived technique is assessed with numerical results that are obtained from the porous mediums using simplified symmetric geometry. The results, including the displacements, temperature, stresses and the change in the volume fraction field, are offered graphically. Comparisons are made among the outcomes obtained under weak, normal and strong conductivity.

Topics & Concepts

Eigenvalues and eigenvectorsLaplace transformThermal conductivityWork (physics)Porous mediumVolume fractionPorosityMathematical analysisMaterials scienceConductivityField (mathematics)MathematicsPhysicsThermodynamicsComposite materialPure mathematicsQuantum mechanicsThermoelastic and Magnetoelastic PhenomenaNanofluid Flow and Heat TransferNumerical methods in engineering