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S. A. Silling, Reformulation of elasticity theory for discontinuities and long-range forces, J. Mech. Phys. Solids, vol. 48, no. 1, pp. 175–209, 2000.Search in Google Scholar
S. A. Silling and R. B. Lehoucq, Convergence of peridynamics to classical elasticity theory, J. Elasticity, vol. 93, no. 1, pp. 13–37, 2008.Search in Google Scholar
S. A. Silling, Linearized theory of peridynamic states, J. Elasticity, vol. 99, no. 1, pp. 85–111, 2010.Search in Google Scholar
E. Emmrich, R. B. Lehoucq, and D. Puhst, Peridynamics: a nonlocal continuum theory, in Meshfree methods for partial differential equations VI, vol. 89 of Lect. Notes Comput. Sci. Eng., pp. 45–65, Springer, Heidelberg, 2013.Search in Google Scholar
A. Javili, R. Morasata, E. Oterkus, and S. Oterkus, Peridynamics review, Math. Mech. Solids, vol. 24, no. 11, pp. 3714–3739, 2019.Search in Google Scholar
F. Bobaru, J. T. Foster, P. H. Geubelle, and S. A. Silling, eds., Handbook of peridynamic modeling. Advances in Applied Mathematics, CRC Press, Boca Raton, FL, 2017.Search in Google Scholar
E. Emmrich and D. Puhst, Survey of existence results in nonlinear peridynamics in comparison with local elastodynamics, Comput. Methods Appl. Math., vol. 15, no. 4, pp. 483–496, 2015.Search in Google Scholar
P. Seleson, M. L. Parks, M. Gunzburger, and R. B. Lehoucq, Peridynamics as an upscaling of molecular dynamics, Multiscale Model. Simul., vol. 8, no. 1, pp. 204–227, 2009.Search in Google Scholar
S. A. Silling and R. B. Lehoucq, Peridynamic theory of solid mechanics, Adv. Appl. Mech., vol. 44, pp. 73–166, 2010.Search in Google Scholar
I. Amin, A. H. El-Aassar, Y. K. Galadima, E. Oterkus, and H. Shawky, Modelling of viscoelastic materials using non-ordinary state-based peridynamics, Engineering with Computers, vol. 40, no. 1, pp. 527–540, 2023.Search in Google Scholar
R. Delorme, L. Laberge Lebel, M. Laveque, and I. Tabiai, Generalization of the ordinary state-based peridynamic model for isotropic linear viscoelasticity, Mech. Time-Depend. Mater., vol. 21, no. 4, pp. 549–575, 2017.Search in Google Scholar
E. Madenci and S. Oterkus, Ordinary state-based peridynamics for thermoviscoelastic deformation, Eng. Fract. Mech., vol. 175, pp. 31–45, 2017.Search in Google Scholar
J. A. Mitchell, A non-local, ordinary-state-based viscoelasticity model for peridynamics, Tech. Rep. SAND2011-8064, Sandia National Laboratories, Albuquerque, NM, and Livermore, CA, 2011.Search in Google Scholar
O. Weckner and N. A. Nik Mohamed, Viscoelastic material models in peridynamics, Appl. Math. Comput., vol. 219, no. 11, pp. 6039–6043, 2013.Search in Google Scholar
D.-L. Tian and X.-P. Zhou, A viscoelastic model of geometry-constraint-based non-ordinary state-based peridynamics with progressive damage, Comput. Mech., vol. 69, no. 6, pp. 1413–1441, 2022.Search in Google Scholar
T. Mengesha and Q. Du, On the variational limit of a class of nonlocal functionals related to peridynamics, Nonlinearity, vol. 28, no. 11, pp. 3999–4035, 2015.Search in Google Scholar
G. Dal Maso, An introduction to Γ-convergence, vol. 8 of Progress in Nonlinear Differential Equations and their Applications. Birkh¨auser Boston, Inc., Boston, MA, 1993.Search in Google Scholar
M. Kružík and T. Roubíček, Mathematical methods in continuum mechanics of solids. Interaction of Mechanics and Mathematics, Springer, Cham, 2019.Search in Google Scholar
R. E. Showalter, Monotone operators in Banach space and nonlinear partial differential equations, vol. 49 of Mathematical Surveys and Monographs. American Mathematical Society, Providence, RI, 1997.Search in Google Scholar
A. Mielke, On evolutionary Γ -convergence for gradient systems, in Macroscopic and large scale phenomena: coarse graining, mean field limits and ergodicity, vol. 3 of Lect. Notes Appl. Math. Mech., pp. 187–249, Springer, [Cham], 2016.Search in Google Scholar
E. Sandier and S. Serfaty, Gamma-convergence of gradient flows with applications to Ginzburg-Landau, Comm. Pure Appl. Math., vol. 57, no. 12, pp. 1627–1672, 2004.Search in Google Scholar
F. Santambrogio, {Euclidean, metric, and Wasserstein} gradient flows: an overview, Bull. Math. Sci., vol. 7, no. 1, pp. 87–154, 2017.Search in Google Scholar
E. Emmrich, R. B. Lehoucq, and D. Puhst, Peridynamics: a nonlocal continuum theory, in Meshfree methods for partial differential equations VI, vol. 89 of Lect. Notes Comput. Sci. Eng., pp. 45–65, Springer, Heidelberg, 2013.Search in Google Scholar
E. Emmrich and D. Puhst, Survey of existence results in nonlinear peridynamics in comparison with local elastodynamics, Comput. Methods Appl. Math., vol. 15, no. 4, pp. 483–496, 2015.Search in Google Scholar
E. Emmrich and O. Weckner, On the well-posedness of the linear peridynamic model and its convergence towards the Navier equation of linear elasticity, Commun. Math. Sci., vol. 5, no. 4, pp. 851–864, 2007.Search in Google Scholar
M. Arndt and M. Griebel, Derivation of higher order gradient continuum models from atomistic models for crystalline solids, Multiscale Model. Simul., vol. 4, no. 2, pp. 531–562, 2005.Search in Google Scholar
W. E and P. Ming, Cauchy-Born rule and the stability of crystalline solids: dynamic problems, Acta Math. Appl. Sin. Engl. Ser., vol. 23, no. 4, pp. 529–550, 2007.Search in Google Scholar
Q. Du and K. Zhou, Mathematical analysis for the peridynamic nonlocal continuum theory, ESAIM Math. Model. Numer. Anal., vol. 45, no. 2, pp. 217–234, 2011.Search in Google Scholar
T. Mengesha and J. M. Scott, The solvability of a strongly-coupled nonlocal system of equations, J. Math. Anal. Appl., vol. 486, no. 2, pp. 123919, 21, 2020.Search in Google Scholar
G. M. Coclite, S. Dipierro, F. Maddalena, and E. Valdinoci, Wellposedness of a nonlinear peridynamic model, Nonlinearity, vol. 32, no. 1, pp. 1–21, 2019.Search in Google Scholar
T. Mengesha and Q. Du, The bond-based peridynamic system with Dirichlet-type volume constraint, Proc. Roy. Soc. Edinburgh Sect. A, vol. 144, no. 1, pp. 161–186, 2014.Search in Google Scholar
M. Yangari, Existence and uniqueness of weak solutions for nonlocal parabolic problems via the Galerkin method, J. Math. Anal. Appl., vol. 463, no. 2, pp. 910–921, 2018.Search in Google Scholar
M. Yang, S. Zhang, and Y. Nie, On weak solutions for a nonlocal model with nonlocal damping term, J. Math. Anal. Appl., vol. 525, no. 2, pp. Paper No. 127306, 16, 2023.Search in Google Scholar
J. C. Bellido, J. Cueto, and C. Mora-Corral, Bond-based peridynamics does not converge to hyperelasticity as the horizon goes to zero, J. Elasticity, vol. 141, no. 2, pp. 273–289, 2020.Search in Google Scholar
M. Kružík, C. Mora-Corral, and U. Stefanelli, Quasistatic elastoplasticity via peridynamics: existence and localization, Contin. Mech. Thermodyn., vol. 30, no. 5, pp. 1155–1184, 2018.Search in Google Scholar
A. Mielke, T. Roubíček, and U. Stefanelli, Γ-limits and relaxations for rate-independent evolutionary problems, Calc. Var. Partial Differential Equations, vol. 31, no. 3, pp. 387–416, 2008.Search in Google Scholar
Q. Du, M. Gunzburger, R. B. Lehoucq, and K. Zhou, Analysis and approximation of nonlocal diffusion problems with volume constraints, SIAM Rev., vol. 54, no. 4, pp. 667–696, 2012.Search in Google Scholar
Q. Du, M. Gunzburger, R. B. Lehoucq, and K. Zhou, A nonlocal vector calculus, nonlocal volume-constrained problems, and nonlocal balance laws, Math. Models Methods Appl. Sci., vol. 23, no. 3, pp. 493–540, 2013.Search in Google Scholar
T. Mengesha, Nonlocal Korn-type characterization of Sobolev vector fields, Commun. Contemp. Math., vol. 14, no. 4, pp. 1250028, 28, 2012.Search in Google Scholar
T. Mengesha and Q. Du, Nonlocal constrained value problems for a linear peridynamic Navier equation, J. Elasticity, vol. 116, no. 1, pp. 27–51, 2014.Search in Google Scholar
G. Friesecke, R. D. James, and S. Müller, A hierarchy of plate models derived from nonlinear elasticity by gamma-convergence, Arch. Ration. Mech. Anal., vol. 180, no. 2, pp. 183–236, 2006.Search in Google Scholar
S. G. Lobanov and O. G. Smolyanov, Ordinary differential equations in locally convex spaces, Uspekhi Mat. Nauk, vol. 49, no. 3(297), pp. 93–168, 1994.Search in Google Scholar
U. Stefanelli, The Brezis-Ekeland principle for doubly nonlinear equations, SIAM J. Control Optim., vol. 47, no. 3, pp. 1615–1642, 2008.Search in Google Scholar
H. Brezis, Functional analysis, Sobolev spaces and partial differential equations. Universitext, Springer, New York, 2011.Search in Google Scholar
T. Mengesha and D. Spector, Localization of nonlocal gradients in various topologies, Calc. Var. Partial Differential Equations, vol. 52, no. 1-2, pp. 253–279, 2015.Search in Google Scholar
G. Foghem and M. Kassmann, A general framework for nonlocal Neumann problems, Commun. Math. Sci., vol. 22, no. 1, pp. 15–66, 2024.Search in Google Scholar
Q. Du, X. Tian, and Z. Zhou, Nonlocal diffusion models with consistent local and fractional limits, in Approximation, Applications, and Analysis of Nonlocal, Nonlinear Models, vol. 165 of The IMA Volumes in Mathematics and its Applications, Springer, Cham, 2023.Search in Google Scholar
J. A. Baker, Integration over spheres and the divergence theorem for balls, Amer. Math. Monthly, vol. 104, no. 1, pp. 36–47, 1997.Search in Google Scholar
