Abstract
AbstractWe combine classical continuum mechanics with the recently developed calculus for mixed-dimensional problems to obtain governing equations for flow in, and deformation of, fractured materials. We present models in both the context of finite and infinitesimal strain, and discuss nonlinear (and non-differentiable) constitutive laws such as friction models and contact mechanics in the fracture. Using the theory of well-posedness for evolutionary equations with maximal monotone operators, we show well-posedness of the model in the case of infinitesimal strain and under certain assumptions on the model parameters.
Publisher
Springer Science and Business Media LLC
Subject
Mechanical Engineering,Computational Mechanics
Reference40 articles.
1. Marsden, J.E., Hughes, T.J.: Mathematical Foundations of Elasticity. Prentice-Hall, University of Minnesota, Englewood Cliffs (1994)
2. Kikuchi, N., Oden, J.T.: Contact Problems in Elasticity: A Study of Variational Inequalities and Finite Element Methods. SIAM, Philadelphia (1988)
3. Coussy, O.: Poromechanics of freezing materials. J. Mech. Phys. Solids 53(8), 1689–1718 (2005)
4. Boon, W.M., Nordbotten, J.M., Vatne, J.E.: Functional analysis and exterior calculus on mixed-dimensional geometries. Ann. Mat. Pura Appl. (1921-) 200(2), 757–789 (2021)
5. Martin, V., Jaffré, J., Roberts, J.E.: Modeling fractures and barriers as interfaces for flow in porous media. SIAM J. Sci. Comput. 26(5), 1667–1691 (2005)
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