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Plumb, R. A., and D. McEwan (1978), The instability of a
forced standing wave in a viscous stratified fluid: A laboratory
analogue of the quasi-biennial oscillation, J. Atmos. Sci. , 35 ,
1827-1839.
Prusa, J. M., and P. K. Smolarkiewicz (2003), An all-scale anelas-
tic model for geophysical flows: Dynamic grid deformation,
J. Comput. Phys. , 190 , 601-622.
Raymond, D. J. (2001), A new model of the MaddenJulian
Oscillation, J. Atmos. Sci. , 58 , 2807-2819.
Rogers, T. M., K. B. MacGregor, and G. A. Glatzmaier (2008),
Non-linear dynamics of gravity wave driven flows in the solar
radiative interior, Mon. Not. R. Astron. Soc. , 387 , 616, 630.
Sakai S. (1997), Atmosphere and ocean in a laboratory, GFD-
Dennou Club, http://www.gfd-dennou.org/library/gfd_exp/.
Saujani, S., and T. G. Shepherd (2006), A unified theory of
balance in the extratropics, J. Fluid Mech. , 569 , 447-464.
Scaife, A., N. Butchart, C. D. Warner, D. Stainforth, and
W. Norton (2000), Realistic quasi-biennial oscillations in a
simulation of the global climate, Geophys. Res. Lett. , 27 (9),
3481-3484.
Schinder, P. J., et al. (2011), Saturn's equatorial oscillation: Evi-
dence of descending thermal structure from Cassini radio
occultations, Geophys. Res. Lett. , 38 (L08205), 1-5.
Smolarkiewicz, P. K. (2006), Multidimensional positive definite
advection transport algorithm: An overview, Int. J. Numer.
Methods Fluids , 50 , 1123-1144.
Smolarkiewicz, P. K., and L. G. Margolin (1997), On forward-
in-time differencing for fluids: An Eulerian/semi-Lagrangian
non-hydrostatic model for stratified flows, Atmos. Ocean Spe-
cial , 35 , 127-152.
Smolarkiewicz, P. K., and L. G. Margolin (1998), MPDATA: A
finite difference solver for geophysical flows, J. Comput. Phys. ,
140 , 459-480.
Smolarkiewicz, P. K., and L. G. Margolin (2000), Variational
methods for elliptic problems in fluid models, in Proceed-
ings of 2000 ECMWF Workshop on Developments in Numer-
ical Methods for Very High Resolution Global Models ,pp.
137-159, Eur. Cent. for Medium-Range Weather Forecasts,
Reading, UK.
Smolarkiewicz, P. K., and J. M. Prusa (2002), Forward-in-time
differencing for fluids: Simulation of geophysical turbulence,
in Turbulent Flow Computation , edited by D. Drikakis and
B. Guertz, pp. 279-312, Series: Fluid Mechanics and Its Appli-
cations, Vol. 66, Springer.com.
Smolarkiewicz, P. K., and J. M. Prusa (2005), Towards mesh
adaptivity for geophysical turbulence: Continuous mapping
approach, Int. J. Numer. Methods Fluids , 47 , 789-801.
Takahashi, M., and B. A. Boville (1992), A three-dimensional
simulation of the equatorial quasi-biennial oscillation, J.
Atmos. Sci. , 49 , 1020-1035.
Tindall, J. C. (2003), Dynamics of the tropical tropopause and
lower stratosphere, Ph.D. thesis, University of Reading, Read-
ing, UK.
Uppala, S. M., et al. (2005), The ERA-40 re-analysis, Q. J. R.
Meteorol. Soc. , 131 , 2961-3012.
Vitart,F., andT. T. Jung (2010), Impact of the northern hemisphere
extratropics on the skill in predicting the Madden-Julian
Oscillation, Geophys. Res. Lett. , 37 (L23805), 1-6.
Wedi, N. P. (2006), The energetics of wave-driven mean flow
oscillations, Int. J. Numer. Methods Fluids , 50 (10), 1175-1191,
special issue: Multidimensional Positive Definite Advection
Transport Algorithm Methods.
Wedi, N. P., and P. K. Smolarkiewicz (2004), Extending Gal-
Chen & Somerville terrain-following coordinate transforma-
tion on time-dependent curvilinear boundaries, J. Comput.
Phys. , 193 , 1-20.
Wedi, N. P., and P. K. Smolarkiewicz (2006), Direct numerical
simulation of the Plumb-McEwan laboratory analog of the
QBO, J. Atmos. Sci. , 63 (12), 3226-3252.
Wedi, N. P., and P. K. Smolarkiewicz (2008), A reduced model of
the Madden-Julian oscillation, Int. J. Numer. Methods Fluids ,
56 , 1583-1588.
Wedi, N. P., and P. K. Smolarkiewicz (2009), A framework for
testing global nonhydrostatic models, Q. J. R. Meteorol. Soc. ,
135 , 469-484.
Wedi, N. P., and P. K. Smolarkiewicz (2010), A nonlinear per-
spective on the dynamics of the MJO: Idealized large-eddy
simulations, J. Atmos. Sci. , 67 , 1202-1217.
Wheeler, M., and G. N. Kiladis (1999), Convectively cou-
pled equatorial waves: Analysis of clouds and temperature
in the wave number-frequency domain, J. Atmos. Sci. , 56 ,
374-399.
Williamson, D. L. (2007), The evolution of dynamical cores
for global atmospheric models, J. Meteor. Soc. Japan , 85B ,
241-269.
Williamson, D. L., et al. (2011), APE-atlas, Tech. Rep. TN-484,
NCAR, Boulder, Colo.
Yamamoto, M., and M. Takahashi (2003), The fully developed
superrotation simulated by a general circulation model of a
Venus-like atmosphere, J. Atmos. Sci. , 60 , 561-574.
Yano, J.-I., and M. Bonazzola (2009), Scale analysis for the
large-scale tropical atmospheric dynamics, J. Atmos. Sci. , 66 ,
159-172.
Zagar, N., E. Andersson, and M. Fisher (2005), Balanced tropi-
cal data assimilation based on a study of equatorial waves in
ECMWF short-range forecast errors, Q. J. R. Meteorol. Soc. ,
131 , 987-1011.
Zhang, C. (2005), Madden-Julian oscillation, Rev. Geophys. , 43 ,
doi:10.1029/2004RG000158.
 
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