Yue Mei
Affiliations: | Texas A & M University, College Station, TX, United States |
Area:
inverse problem in elasticityGoogle:
"Yue Mei"
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Publications
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| Zhao X, Sun Y, Mei Y. (2019) A Size-Dependent Cost Function to Solve the Inverse Elasticity Problem Applied Sciences. 9: 1799 |
| Mei Y, Avril S. (2019) On improving the accuracy of nonhomogeneous shear modulus identification in incompressible elasticity using the virtual fields method International Journal of Solids and Structures. 136-144 |
| Mei Y, Goenezen S. (2019) Quantifying the anisotropic linear elastic behavior of solids International Journal of Mechanical Sciences. 163: 105131 |
| Mei Y, Wang S, Shen X, et al. (2018) Erratum: Mei, Y., et al. Mechanics Based Tomography: A Preliminary Feasibility Study. Sensors 2017, 17, 1075. Sensors (Basel, Switzerland). 18 |
| Luo P, Mei Y, Kotecha M, et al. (2018) Characterization of the stiffness distribution in two and three dimensions using boundary deformations: a preliminary study Mrs Communications. 8: 893-902 |
| Mei Y, Yu P. (2018) Mapping Heterogeneous Elastic Property Distribution of Soft Tissues Using Harmonic Motion Data: A Theoretical Study Mathematical Problems in Engineering. 2018: 1-8 |
| Mei Y, Goenezen S. (2018) Mapping the Viscoelastic Behavior of Soft Solids From Time Harmonic Motion Journal of Applied Mechanics. 85 |
| Mei Y, Stover B, Afsar Kazerooni N, et al. (2018) A comparative study of two constitutive models within an inverse approach to determine the spatial stiffness distribution in soft materials International Journal of Mechanical Sciences. 140: 446-454 |
| Mei Y, Hurtado DE, Pant S, et al. (2018) On improving the numerical convergence of highly nonlinear elasticity problems Computer Methods in Applied Mechanics and Engineering. 337: 110-127 |
| Lalitha Sridhar S, Mei Y, Goenezen S. (2018) Improving the sensitivity to map nonlinear parameters for hyperelastic problems Computer Methods in Applied Mechanics and Engineering. 331: 474-491 |