A Posteriori Error Analysis of the FEM Solution for Generic Linear Second-Order ODEs

M. Adnan, A. Ahmed, A numerical approach to the solution of the system of second-order boundary value problems, Global Journal of Science Frontier Research: F Mathematics and Decision Sciences, 18 (2018)

J. Argyris, D. Scharpf, Finite elements in time and space, Nuclear Engineering and Design, 10, 456-464(1969)

C. Danet, Existence and uniqueness for a semilinear sixth-order ODE, Electronic Journal of Qualitative Theory of Differential Equations, 1-22(2022)

M. Delfour, W. Hager, F. Trochu, Discontinuous Galerkin methods for ordinary differential equations, Math. Comp., 36, 455-473(1981)

D. Estep, A posteriori error bounds and global error control for approximation of ordinary differential equations, SIAM, 32, 1-48(1995)

D. Estep, A. Stuart, The dynamical behavior of the discontinuous Galerkin method and related difference schemes, AMS, 71, 1073-1103(1995)

B. Holm, T. Wihler, Continuous and discontinuous Galerkin time stepping methods for nonlinear initial value problems with application to finite time blow-up, Numerische Mathematik, 138, 767799(2018)

B. Hulme, Discrete Galerkin and related one-step methods for ordinary differential equations, Math. Comput., 26, 881-891(1972)

H. Huynh, Discontinuous Galerkin and related methods for ODE, Eleventh International Conference on Computational Fluid Dynamics (ICCFD11), Maui, Hawaii, USA, July 11-15, (2022).

B. Janssen, T. Wihler, Existence results for the continuous and discontinuous Galerkin time stepping methods for nonlinear initial value problems, arXiv:1407.5520v1, (2014)

A. Schmidt, H. Beyer, M. Hinze, E. Vandoros, Finite element approach for the solution of first-order differential equations, J. Appl. Math. and Phys., 8, 2072-2090(2020)

N. Sohel, S. Islam, S. Islam, Galerkin residual correction for fourth order BVP, J. of Appl. Math. and Comp., 6, 127-138(2022)

N. Sohel, S. Islam, S. Islam, Kamrujjaman, Galerkin method and its residual correction with modified Legendre polynomials, Contemporary Mathematics, (2022)

E. Süli, Finite element methods for partial differential equations, lecture notes, University of Oxford, 2000.

L. Wand, M. Zhang, H. Tian, L. Yi, hp-version C^1-continuous Petrov-Galerkin method for nonlinear second-order initial value problems with application to wave equations, arXiv:2303.14345v1, (2023)

S. Zhao, G. Wei, A unified discontinuous Galerkin framework for time integration, Math. Method. Appl. Sci., 37, 1042-1071(2014)

O. Zienkiewicz, R. Taylor, J. Zhu, The Finite Element Method Its Basis E Fundamentals, Butterworth-Heinemann, The 7^th Edition, 2013.