Jang, T.S. (2021) Pseudo-parameter Iteration Method (PIM): A semi-analytic solution procedure for nonlinear problems. Communications in Nonlinear Science and Numerical Simulation 97, 105733. [Link]
Jang, T.S. (2021) A new solution approach to the Serre equations. IMA Journal of Applied Mathematics 86, 30–57. [Link]
Jang, T. S., Sung, H. G. (2021). New nonlinear theory for a piston-type wavemaker: The classical Boussinesq equations. Applied Mathematical Modelling, 91, 43-57. [Link]
Ahmad, F., Jang, T. S., Carrasco, J. A., Rehman, S. U., Ali, Z., & Ali, N. (2018). An efficient iterative method for computing deflections of Bernoulli-Euler-von Karman beams on a nonlinear elastic foundation. Applied Mathematics and Computation, 334, 269-287. [Link]
Jang, T. S. (2018). A new functional iterative algorithm for the regularized long-wave equation using an integral equation formalism. Journal of Scientific Computing, 74(3), 1504-1532. [Link]
Jang, T. S. (2018). A regular integral equation formalism for solving the standard Boussinesq’s equations for variable water depth. Journal of Scientific Computing, 75(3), 1721-1756. [Link]
Jang, T. S. (2018). An improvement of convergence of a dispersion-relation preserving method for the classical Boussinesq equation. Communications in Nonlinear Science and Numerical Simulation, 56, 144-160. [Link]
Jang, T. S. (2017). A new dispersion-relation preserving method for integrating the classical Boussinesq equation. Communications in Nonlinear Science and Numerical Simulation, 43, 118-138. [Link]
Jang, T. S. (2016). A new solution procedure for a nonlinear infinite beam equation of motion. Communications in Nonlinear Science and Numerical Simulation, 39, 321-331. [Link]
Jang, T. S. (2015). A new solution procedure for the nonlinear telegraph equation. Communications in Nonlinear Science and Numerical Simulation, 29(1-3), 307-326. [Link]
Jang, T. S. (2014). An integral equation formalism for solving the nonlinear Klein-Gordon equation. Applied Mathematics and Computation, 243, 322-338. [Link]
Jang, T. S. (2014). Uniqueness and stability of the simultaneous detection of the nonlinear restoring and excitation of a forced nonlinear oscillation. Applied Mathematics and Computation, 228, 234-239. [Link]
Jang, T. S. (2013). A method for simultaneous identification of the full nonlinear damping and the phase shift and amplitude of the external harmonic excitation in a forced nonlinear oscillator. Computers and Structures, 120, 77-85. [Link]
Jang, T. S. (2013). A new semi-analytical approach to large deflections of Bernoulli-Euler-v. Karman beams on a linear elastic foundation: Nonlinear analysis of infinite beams. International Journal of Mechanical Sciences, 66, 22-32. [Link]
Jang, T. S., Baek, H., Choi, H. S., & Lee, S. G. (2011). A new method for measuring nonharmonic periodic excitation forces in nonlinear damped systems. Mechanical Systems and Signal Processing, 25(6), 2219-2228. [Link]
Jang, T. S. (2011). Non-parametric simultaneous identification of both the nonlinear damping and restoring characteristics of nonlinear systems whose dampings depend on velocity alone. Mechanical Systems and Signal Processing, 25(4), 1159-1173. [Link]
Jang, T. S., Baek, H., Han, S. L., & Kinoshita, T. (2010). Indirect measurement of the impulsive load to a nonlinear system from dynamic responses: Inverse problem formulation. Mechanical Systems and Signal Processing, 24(6), 1665-1681. [Link]