- Jang, T. S. (2021).A new solution approach to the Serre equations. IMA journal of Applied Mathematics, 86(1), 30-57.
- 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.
- Jang, T. S., Sung, H. G. (2021). A new nonlinear theory of a piston-type wavemaker: the classical Boussinesq equations. Applied Mathematical Modelling, 91, 43-57.
- Syngellakis, S., Park, J., Cho, D. S., & Jang, T. S. (2020). A numerical study on an infinite linear elastic Bernoulli-Euler beam on a viscoelastic foundation subjected to harmonic line loads. Journal of Mechanical Science and Technology, 34(9), 3587-3595.
- Ullah, M. Z., Jang, T. S. (2020). An efficient numerical scheme for analyzing bioconvection in von-Kármán flow of third-grade nanofluid with motile microorganisms. Alexandria Engineering Journal, 59, 2739-2752.
- Jang, T. S. (2020). An integral equation formalism for integrating a nonlinear initial-boundary value problem for a Boussinesq equation. Mathematical Problems in Engineering, 2020, Article ID 6083128.
- Baek, H., Park, J., Jang, T. S., Sung, H. G., & Paik, J. K. (2020). Numerical investigation of non-linear deflections of an infinite beam on non-linear and discontinuous elastic foundation. Ships and Offshore Structures, 15, 19-28.
- 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.
- 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.
- 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.
- 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.
- 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.
- Ahmad, F., Ullah, M. Z., Jang, T. S., & Alaidarous, E. S. (2017). An efficient method for the static deflection analysis of an infinite beam on a nonlinear elastic foundation of one-way spring model. Ships and Offshore Structures, 12(7), 963-970.
- Park, J., Sung, H. G., Ahmad, F., So, S. H., Syngellakis, S., Jung, K. H., & Jang, T. S. (2017). A numerical identification of excitation force and nonlinear restoring characteristics of ship roll motion. Journal of Marine Science and Technology-Taiwan, 25(4), 475-481.
- 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.
- Ahmad, F., Jang, T. S., Park, J., & Sung, H. G. (2016). Simultaneous detection of the nonlinear restoring and excitation of a forced nonlinear oscillation: an integral approach. Journal of Marine Science and Technology, 21(2), 240-250.
- 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.
- Jang, T. S. (2015). A new mathematical procedure for simultaneous identification of the nonlinear damping and restoring characteristics based on acceleration measurements. Ships and Offshore Structures, 10(4), 426-435.
- 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.
- Jang, T. S. (2014). A general method for analyzing moderately large deflections of a non-uniform beam: An infinite Bernoulli-Euler-von Karman beam on a nonlinear elastic foundation. Acta Mechanica, 225(7), 1967-1984.
- Jang, T. S. (2014). An integral equation formalism for solving the nonlinear Klein-Gordon equation. Applied Mathematics and Computation, 243, 322-338.
- Jang, T. S. An integral equation formalism for solving the nonlinear Klein-Gordon equation, Applied Mathematics and Computation 243 (2014), 322–338
- 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.
- Park, J., Bai, H., & Jang, T. S. (2013). A Numerical Approach to Static Deflection Analysis of an Infinite Beam on a Nonlinear Elastic Foundation: One-Way Spring Model. Journal of Applied Mathematics, 2013(Article ID 136358), 1-10. https://doi.org/doi.org/10.1155/2013/136358 Research
- 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.
- Jang, T. S. (2013). A New Simultaneous Identification of the Harmonic Excitations and Nonlinear Damping of Forced Damped Nonlinear Oscillations : A Parametric Approach. Journal of Applied Mathematics, 2013(Article ID 754576), 1-7. https://doi.org/doi.org/10.1155/2013/754576
- Choi, S. W., & Jang, T. S. (2012). Existence and uniqueness of nonlinear deflections of an infinite beam resting on a non-uniform nonlinear elastic foundation. Boundary Value Problems, 2012(5), 1-24. Retrieved from http://boundaryvalueproblems.springeropen.com/articles/10.1186/1687-2770-2012-5
- Jang, T. S., & Sung, H. G. (2012). A new semi-analytical method for the non-linear static analysis of an infinite beam on a non-linear elastic foundation: A general approach to a variable beam cross-section. International Journal of Non-Linear Mechanics, 47(4), 132-139.
- Jang, T. S., Sung, H. G., & Park, J. (2012). A determination of an abrupt motion of the sea bottom by using snapshot data of water waves. Mathematical Problems in Engineering, 2012, Article ID 472575.
- Lee, S. K., Joung, T. H., Cheon, S. J., Jang, T. S., & Lee, J. H. (2011). Evaluation of the added mass for a spheroid-type unmanned underwater vehicle by vertical planar motion mechanism test. International Journal of Naval Architecture and Ocean Engineering, 3(3), 174-180.
- Jang, T. S., Baek, H. S., & Paik, J. K. (2011). A new method for the non-linear deflection analysis of an infinite beam resting on a non-linear elastic foundation. International Journal of Non-Linear Mechanics, 46(1), 339-346.
- Jang, T. S., Baek, H., Kim, M. C., & Moon, B. Y. (2011). A new method for detecting the time-varying nonlinear damping in nonlinear oscillation systems: Nonparametric identification. Mathematical Problems in Engineering, 2011, Article ID 749309.
- Jang, T. S. (2011). A novel method for the non-parametric identification of nonlinear restoring forces in nonlinear vibrations based on response data: a dissipative nonlinear dynamical system. Ships and Offshore Structures, 6(4), 257-263.
- 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.
- 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.
- Jang, T. S., Han, S. L., & Kinoshita, T. (2010). An inverse measurement of the sudden underwater movement of the sea-floor by using the time-history record of the water-wave elevation. Wave Motion, 47(3), 146-155.
- Jang, T. S., Kwon, S. H., & Lee, J. H. (2010). Recovering the functional form of the nonlinear roll damping of ships from a free-roll decay experiment: An inverse formulism. Ocean Engineering, 37(14-15), 1337-1344.
- 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.
- Jang, T. S., Kwon, S. H., & Han, S. L. (2009). A novel method for non-parametric identification of nonlinear restoring forces in nonlinear vibrations from noisy response data: A conservative system. Journal of Mechanical Science and Technology, 23, 2938-2947.
- Jang, T. S., Choi, H. S., & Han, S. L. (2009). A new method for detecting non-linear damping and restoring forces in non-linear oscillation systems from transient data. International Journal of Non-Linear Mechanics, 44(7), 801-808.
- Jang, T. S., & Han, S. L. (2009). A numerical investigation of the inverse problem of the wavemaker. Ships and Offshore Structures, 4(4), 315-321.
- Jang, T. S., & Han, S. L. (2009). Numerical experiments on determination of spatially concentrated time-varying loads on a beam: an iterative regularization method. Journal of Mechanical Science and Technology, 23, 2722-2729.
- Jang, T. S., & Han, S. L. (2008). Application of Tikhonov’s regularization to unstable water waves of the two-dimensional fluid flow: Spectrum with compact support. Ships and Offshore Structures, 3(1), 41-47.
- Jang, T. S., Sung, H. G., Han, S. L., & Kwon, S. H. (2008). Inverse determination of the loading source of the infinite beam on elastic foundation. Journal of Mechanical Science and Technology, 22, 2350-2356.
- Kwon, S. H., Kim, C. H., & Jang, T. S. (2007). An identification of wave propagation based on a single-point measurement. Ocean Engineering, 34, 1405-1412.
- Jang, T. S., Kwon, S. H., & Choi, H. S. (2007). Nonlinear wave profiles of wave-wave interaction in a finite water depth by fixed point approach. Ocean Engineering, 34, 451-459.
- Jang, T. S., Kwon, S. H., & Kim, B. J. (2007). Solution of an unstable axisymmetric Cauchy-Poisson problem of dispersive water waves for a spectrum with compact support. Ocean Engineering, 34(5-6), 676-684.
- Jang, T. S., Kwon, S. H., Kinoshita, T., & Kim, B. J. (2007). A nonlinear wave profile correction of the diffraction of a wave by a long breakwater: Fixed point approach. Ocean Engineering, 34, 500-509.
- Jang, T. S., Kwon, S. H., & Kim, B. J. (2006). Nonlinear wave interaction of three stokes’ waves in deep water: Banach fixed point method. Journal of Mechanical Science and Technology, 20(11), 1950-1960.
- Jang, T. S., Kwon, S. H., & Kim, B. J. (2006). On an improvement of a nonlinear iterative scheme for nonlinear wave profile prediction. Ocean Engineering, 33(11-12), 1552-1564.
- Jang, T. S. (2006). A fixed point approach to superposition of two wave trains in deep water: Wave profiles with nonlinear amplitude dispersion. Ships and Offshore Structures, 1(4), 279-287.
- Jang, T. S., Kwon, S. H., & Hwang, S. H. (2006). Application of an iterative method to nonlinear superposition of water wave profiles: FFT and mathematical analysis. Ships and Offshore Structures, 1(2), 83-88.
- Jang, T. S., Kwon, S. H., & Kinoshita, T. (2005). On the realization of nonlinear wave profiles using the Banach fixed-point theorem: Stokes wave in a finite depth. Journal of Marine Science and Technology, 10(4), 181-187.
- Jang, T. S., & Kwon, S. H. (2005). Application of nonlinear iteration scheme to the nonlinear water wave problem: Stokian wave. Ocean Engineering, 32, 1864-1872.
- Jang, T. S., Kinoshita, T., & Yamaguchi, H. (2001). A new functional optimization method applied to the pitch distribution of a marine propeller. Journal of Marine Science and Technology, 6, 23-30.
- Jang, T. S., & Kinoshita, T. (2000). An ill-posed inverse problem of a wing with locally given velocity data and its analysis. Journal of Marine Science and Technology, 5, 16-20.
- Jang, T. S., Choi, H. S., & Kinoshita, T. (2000). Solution of an unstable inverse problem: Wave source evaluation from observation of velocity distribution. Journal of Marine Science and Technology, 5, 181-188.
- Jang, T. S., Choi, H. S., & Kinoshita, T. (2000). Numerical experiments on an ill-posed inverse problem for a given velocity around a hydrofoil by iterative and noniterative regularizations. Journal of Marine Science and Technology, 5, 107-111.
- Jang, T. S., & Kinoshita, T. (2000). A minimization theory in Hilbert space and its application to two-dimensional cavity flow with a numerical study. Journal of Marine Science and Technology, 5, 176-180.