Добірка наукової літератури з теми "Ellipsoidal viscoelastic inclusion"
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Статті в журналах з теми "Ellipsoidal viscoelastic inclusion":
Haberman, Michael R., Yves H. Berthelot, and Mohammed Cherkaoui. "Micromechanical Modeling of Particulate Composites for Damping of Acoustic Waves." Journal of Engineering Materials and Technology 128, no. 3 (November 21, 2005): 320–29. http://dx.doi.org/10.1115/1.2204943.
Jakobsen, Morten, and Mark Chapman. "Unified theory of global flow and squirt flow in cracked porous media." GEOPHYSICS 74, no. 2 (March 2009): WA65—WA76. http://dx.doi.org/10.1190/1.3078404.
Zhang, Jie, Qiuhua Rao, and Wei Yi. "Viscoelastic Parameter Prediction of Multi-Layered Coarse-Grained Soil with Consideration of Interface-Layer Effect." Applied Sciences 10, no. 24 (December 11, 2020): 8879. http://dx.doi.org/10.3390/app10248879.
Koutsawa, Yao, Mohammed Cherkaoui, and El Mostafa Daya. "Multicoating Inhomogeneities Problem for Effective Viscoelastic Properties of Particulate Composite Materials." Journal of Engineering Materials and Technology 131, no. 2 (March 9, 2009). http://dx.doi.org/10.1115/1.3086336.
Dinzart, Florence. "Viscoelastic behavior of composite materials with multi-coated ellipsoidal reinforcements and imperfect interfaces modeled by an equivalent inclusion." Mechanics of Time-Dependent Materials, November 15, 2023. http://dx.doi.org/10.1007/s11043-023-09646-4.
Дисертації з теми "Ellipsoidal viscoelastic inclusion":
Costa, Luan Mayk Torres. "Modélisation micromécanique à variables internes du comportement viscoélastique anisotrope des matériaux hétérogènes : applications aux composites à matrice organique." Electronic Thesis or Diss., Université de Lorraine, 2023. http://www.theses.fr/2023LORR0116.
The primary aim of this thesis is to devise a novel micromechanical approach for predicting the macroscopic viscoelastic response of heterogeneous materials. The behavior is achieved through micromechanical modeling that is based on local properties and microstructure. The effective viscoelastic properties are obtained by the use of appropriate mean-field homogenization methods. The mechanical approach is based on a Volterra integral-form functional constitutive law. Firstly, a new internal variable micromechanical formulation is obtained by utilizing the relaxation modulus. Secondly, a second micromechanical approach is developed, which employs the creep modulus and consists to the dual formulation. Using Green's function techniques, we derive integral equations that describe the heterogeneous viscoelastic problem for both cases. The main equation contains a challenging volume integral term, which necessitates the development of a second complementary integral equation. These two integral equations form the general formulation that we apply to the classical Eshelby viscoelastic inclusion problem. We employ an internal variable method that considers the material's history to be contained in its internal state. The approach is solved directly in the time domain, resulting in an exact solution with reduced computation time compared to hereditary approaches processed in the Laplace-Carson space. Our model enables us to evaluate the impact of anisotropic inclusions and to examine the influence of aging behavior on the composite viscoelastic properties. Both approaches proposed in this thesis deliver results that are consistent with those reported in the literature and offer a significant computational advantage over existing methods