Meyers, S. D., Basu, S., & O'Brien, J. J. (1998). TOPEX/Poseidon altimetry captures cycles of the Indian Ocean. International WOCE Newsletter, 31, 41–42.
|
Baigorria, G. A., Chelliah, M., Mo, K. C., Romero, C. C., Jones, J. W., O'Brien, J. J., et al. (2010). Forecasting Cotton Yield in the Southeastern United States using Coupled Global Circulation Models. Agronomy Journal, 102(1), 187.
|
Ingram, K. T., Jones, J. W., O'Brien, J. J., Roncoli, M. C., Fraisse, C., Breuer, N. E., Bartels, W.-L., Zierden, D. F., Letson, D. (2012). Vulnerability and adaptability of agricultural systems in the Southeast United States to climate variability and climate change. In Climate Change in the Midwest: Impacts, Risks, Vulnerability, and Adaptation (pp. 48–58). Indiana University Press.
|
O'Brien, J., Richards, T. S., & Davis, A. C. (1996). The effect of El Nino on U.S. landfalling hurricanes. Bulletin of the American Meteorological Society, 77(4), 773–774.
|
Morey, S. L., O'Brien, J. J., Schroeder, W. W., & Zavala-Hidalgo, J. (2002). ), Seasonal variability of the export of river discharged freshwater in the Northern gulf of Mexico. MTS/IEEE Oceans 2002 Proceedings, , 1480–1484.
|
Zavala-Hidalgo, J., Morey, S. L., & O'Brien, J. J. (2002). On the formation and interaction of cyclonic eddies with the Loop Current using NCOM and a suite of observations. MTS/IEEE Oceans 2002 Proceedings, , 1463–1466.
|
Subrahmanyam, B., Manghanai, V., O'Brien, J. J., Morrison, J. M., & Xie, L. (2001). A study of the Indian Ocean Dipole Mode Dynamics using satellite observations and MICOM simulations.. San Diego, California, USA.
|
Morey, S. L., Zavala-Hidalgo, J., & O'Brien, J. J. (2005). The seasonal variability of continental shelf circulation in the northern and western Gulf of Mexico from a high-resolution numerical model. In W. Sturges, & A. Lugo-Fernandez (Eds.), New Developments in the Circulation of the Gulf of Mexico. Geophys. Mongr. Ser., (161).
|
Hilburn, K. A., Bourassa, M. A., & O'Brien, J. J. (2002). Development of scatterometer-derived research-quality surface pressure fields for the Southern Ocean. Orlando, FL: AMS.
|
Jones, W. B., & O'Brien, J. J. (1996). Pseudo-spectral methods and linear instabilities in reaction-diffusion fronts. Chaos, 6(2), 219–228.
Abstract: We explore the application of a pseudo-spectral Fourier method to a set of reaction-diffusion equations and compare it with a second-order finite difference method. The prototype cubic autocatalytic reaction-diffusion model as discussed by Gray and Scott [Chem. Eng. Sci. 42, 307 (1987)] with a nonequilibrium constraint is adopted. In a spatial resolution study we find that the phase speeds of one-dimensional finite amplitude waves converge more rapidly for the spectral method than for the finite difference method. Furthermore, in two dimensions the symmetry preserving properties of the spectral method are shown to be superior to those of the finite difference method. In studies of plane/axisymmetric nonlinear waves a symmetry breaking linear instability is shown to occur and is one possible route for the formation of patterns from infinitesimal perturbations to finite amplitude waves in this set of reaction-diffusion equations. (c) 1996 American Institute of Physics.
|