203 related articles for article (PubMed ID: 32394987)
1. A Coupled Mass Transport and Deformation Theory of Multi-constituent Tumor Growth.
Faghihi D; Feng X; Lima EABF; Oden JT; Yankeelov TE
J Mech Phys Solids; 2020 Jun; 139():. PubMed ID: 32394987
[TBL] [Abstract][Full Text] [Related]
2. Macromolecular crowding: chemistry and physics meet biology (Ascona, Switzerland, 10-14 June 2012).
Foffi G; Pastore A; Piazza F; Temussi PA
Phys Biol; 2013 Aug; 10(4):040301. PubMed ID: 23912807
[TBL] [Abstract][Full Text] [Related]
3. On the theory of reactive mixtures for modeling biological growth.
Ateshian GA
Biomech Model Mechanobiol; 2007 Nov; 6(6):423-45. PubMed ID: 17206407
[TBL] [Abstract][Full Text] [Related]
4. A poroelastic mixture model of mechanobiological processes in biomass growth: theory and application to tissue engineering.
Sacco R; Causin P; Lelli C; Raimondi MT
Meccanica; 2017; 52(14):3273-3297. PubMed ID: 32009677
[TBL] [Abstract][Full Text] [Related]
5. A Unified Determinant-Preserving Formulation for Compressible/Incompressible Finite Viscoelasticity.
Wijaya IPA; Lopez-Pamies O; Masud A
J Mech Phys Solids; 2023 Aug; 177():. PubMed ID: 37724292
[TBL] [Abstract][Full Text] [Related]
6. Poromechanics of compressible charged porous media using the theory of mixtures.
Huyghe JM; Molenaar MM; Baajens FP
J Biomech Eng; 2007 Oct; 129(5):776-85. PubMed ID: 17887904
[TBL] [Abstract][Full Text] [Related]
7. A mixture theory for charged-hydrated soft tissues containing multi-electrolytes: passive transport and swelling behaviors.
Gu WY; Lai WM; Mow VC
J Biomech Eng; 1998 Apr; 120(2):169-80. PubMed ID: 10412377
[TBL] [Abstract][Full Text] [Related]
8. A continuum mechanical framework for modeling tumor growth and treatment in two- and three-phase systems.
Miller CT; Gray WG; Schrefler BA
Arch Appl Mech; 2022 Feb; 92(2):461-489. PubMed ID: 35811645
[TBL] [Abstract][Full Text] [Related]
9. A Special Relativistic Exploitation of the Second Law of Thermodynamics and Its Non-Relativistic Limit.
Papenfuss C
Entropy (Basel); 2023 Jun; 25(6):. PubMed ID: 37372296
[TBL] [Abstract][Full Text] [Related]
10. A unified continuum and variational multiscale formulation for fluids, solids, and fluid-structure interaction.
Liu J; Marsden AL
Comput Methods Appl Mech Eng; 2018 Aug; 337():549-597. PubMed ID: 30505038
[TBL] [Abstract][Full Text] [Related]
11. Numerical simulation of a thermodynamically consistent four-species tumor growth model.
Hawkins-Daarud A; van der Zee KG; Oden JT
Int J Numer Method Biomed Eng; 2012 Jan; 28(1):3-24. PubMed ID: 25830204
[TBL] [Abstract][Full Text] [Related]
12. Finite element methods for the biomechanics of soft hydrated tissues: nonlinear analysis and adaptive control of meshes.
Spilker RL; de Almeida ES; Donzelli PS
Crit Rev Biomed Eng; 1992; 20(3-4):279-313. PubMed ID: 1478094
[TBL] [Abstract][Full Text] [Related]
13. Numerical aspects of anisotropic failure in soft biological tissues favor energy-based criteria: A rate-dependent anisotropic crack phase-field model.
Gültekin O; Dal H; Holzapfel GA
Comput Methods Appl Mech Eng; 2018 Apr; 331():23-52. PubMed ID: 31649410
[TBL] [Abstract][Full Text] [Related]
14. Modeling the nonlinear large deformation kinetics of volume phase transition for the neutral thermosensitive hydrogels.
Wang X
J Chem Phys; 2007 Nov; 127(17):174705. PubMed ID: 17994840
[TBL] [Abstract][Full Text] [Related]
15. Multi-component modelling of human brain tissue: a contribution to the constitutive and computational description of deformation, flow and diffusion processes with application to the invasive drug-delivery problem.
Ehlers W; Wagner A
Comput Methods Biomech Biomed Engin; 2015; 18(8):861-79. PubMed ID: 24261340
[TBL] [Abstract][Full Text] [Related]
16. Arterial tissues and their inflammatory response to collagen damage: A continuum in silico model coupling nonlinear mechanics, molecular pathways, and cell behavior.
Gierig M; Wriggers P; Marino M
Comput Biol Med; 2023 May; 158():106811. PubMed ID: 37011434
[TBL] [Abstract][Full Text] [Related]
17. A phase-field model for fracture in biological tissues.
Raina A; Miehe C
Biomech Model Mechanobiol; 2016 Jun; 15(3):479-96. PubMed ID: 26165516
[TBL] [Abstract][Full Text] [Related]
18. In vivo mimicking model for solid tumor towards hydromechanics of tissue deformation and creation of necrosis.
Dey B; Sekhar GPR; Mukhopadhyay SK
J Biol Phys; 2018 Sep; 44(3):361-400. PubMed ID: 29808371
[TBL] [Abstract][Full Text] [Related]
19. A mesostructurally-based anisotropic continuum model for biological soft tissues--decoupled invariant formulation.
Limbert G
J Mech Behav Biomed Mater; 2011 Nov; 4(8):1637-57. PubMed ID: 22098866
[TBL] [Abstract][Full Text] [Related]
20. A theory of biological composites undergoing plastic deformations.
An B; Sun W
J Mech Behav Biomed Mater; 2019 May; 93():204-212. PubMed ID: 30826697
[TBL] [Abstract][Full Text] [Related]
[Next] [New Search]