Thomas P. Witelski
- Professor in the Department of Mathematics
- Professor in the Department of Mechanical Engineering and Materials Science (Secondary)
Research Areas and Keywords
PDE & Dynamical Systems
My primary area of expertise is the solution of nonlinear ordinary and partial differential equations for models of physical systems. Using asymptotics along with a mixture of other applied mathematical techniques in analysis and scientific computing I study a broad range of applications in engineering and applied science. Focuses of my work include problems in viscous fluid flow, dynamical systems, and industrial applications. Approaches for mathematical modelling to formulate reduced systems of mathematical equations corresponding to the physical problems is another significant component of my work.
Bowen, M., and T. P. Witelski. “Pressure-dipole solutions of the thin-film equation.” European Journal of Applied Mathematics, vol. 30, no. 2, Apr. 2019, pp. 358–99. Scopus, doi:10.1017/S095679251800013X. Full Text
Gao, Y., et al. “A vicinal surface model for epitaxial growth with logarithmic free energy.” Discrete and Continuous Dynamical Systems Series B, vol. 23, no. 10, Dec. 2018, pp. 4433–53. Scopus, doi:10.3934/dcdsb.2018170. Full Text
Chiou, Jian-Geng, et al. “Principles that govern competition or co-existence in Rho-GTPase driven polarization..” Plos Comput Biol, vol. 14, no. 4, Apr. 2018. Pubmed, doi:10.1371/journal.pcbi.1006095. Full Text Open Access Copy
Gao, Y., et al. “Global existence of solutions to a tear film model with locally elevated evaporation rates.” Physica D: Nonlinear Phenomena, vol. 350, July 2017, pp. 13–25. Scopus, doi:10.1016/j.physd.2017.03.005. Full Text
Ji, H., and T. P. Witelski. “Finite-time thin film rupture driven by modified evaporative loss.” Physica D: Nonlinear Phenomena, vol. 342, Mar. 2017, pp. 1–15. Scopus, doi:10.1016/j.physd.2016.10.002. Full Text
Smolka, L. B., et al. “Oil capture from a water surface by a falling sphere.” Colloids and Surfaces A: Physicochemical and Engineering Aspects, vol. 497, May 2016, pp. 126–32. Scopus, doi:10.1016/j.colsurfa.2016.02.026. Full Text
George, C., et al. “Experimental study of regular and chaotic transients in a non-smooth system.” International Journal of Non Linear Mechanics, vol. 81, May 2016, pp. 55–64. Scopus, doi:10.1016/j.ijnonlinmec.2015.12.006. Full Text
Witelski, T. P. “Preface to the special issue on “Thin films and fluid interfaces”.” Journal of Engineering Mathematics, vol. 94, no. 1, Oct. 2015. Scopus, doi:10.1007/s10665-014-9760-z. Full Text
Peterson, Ellen, et al. “Stability of traveling waves in thin liquid films driven by gravity and surfactant.” Hyperbolic Problems: Theory, Numerics and Applications, Part 2, edited by E. Tadmor et al., vol. 67, AMER MATHEMATICAL SOC, 2009, pp. 855-+.
Witelski, T. P. “Computing finite-time singularities in interfacial flows.” Modern Methods in Scientific Computing and Applications, edited by A. Bourlioux et al., vol. 75, SPRINGER, 2002, pp. 451–87.
The Math department congratulates its faculty members Tori Akin, Rann Bar-on, Sarah Schott, Hugh Bray and Tom Witelski. They have been recognized by Academic Affairs for their contribution to teaching excellence at Duke. These faculty are in the... read more »
Graduate Student and new PhD, Hangjie (Jessie) Ji, was recognized by the Society for Industrial and Applied Mathematics (SIAM) for her "outstanding efforts and accomplishments" on behalf of the Duke University SIAM chapter. She is pictured here with... read more »
SIAM is the Society of Industrial and Applied Mathematics. We formed this chapter to promote collaboration, interdisciplinary activities, and fellowship between graduate students in the Mathematics and other related departments. Our newly formed... read more »
The Mathematical Problems in Industry (MPI) is a week long workshop where companies bring real world problems to students and researchers in mathematics to find solutions. MPI takes place at a different university every summer. This is the first... read more »
A thin liquid film is a layer of fluid that has a breadth much greater than its depth. A representative example is the tear film that coats your eye to protect it: the thickness of this coating is only a few micrometers but its breadth is a few... read more »