Geoscience Reference
In-Depth Information
Cushman-Roisin, B. (1986), Frontal geostrophic dynamics,
J. Phys. Oceanogra.
,
16
, 132-143.
Cushman-Roisin, B. (1994),
Introduction to Geophysical Fluid
Dynamics
, Prentice-Hall, Englewood cliffs, NJ.
Eccles, F.J.R., P.L. Read, A.A. Castrejón-Pita, and T.W.N. Haine
(2009), Synchronization of modulated traveling baroclinic
waves in a periodically forced, rotating fluid annulus,
Phys.
Rev. E
,
79
, 1:015202.
Faller, A. J. (1963), An experimental study of the instability
of the laminar Ekman boundary layer,
J. Fluid Mech.
,
15
,
560-576.
Flór, J., H. Scolan, and J. Gula (2011). Frontal instabilities and
waves in a differentially rotating fluid,
J. Fluid Mech.
, 685,
532-542.
Ford, R. (1994), Gravity wave radiation from vortex trains in
rotating shallow water,
J. Fluid Mech.
,
281
, 81-118.
Fowlis W. W., and R. Hide (1965), Thermal convection in a rotat-
ing annulus of liquid: Effect of viscosity on the transition
between axisymmetric and non-axisymmetric flow regimes,
J. Atmos. Sci.
,
22
, 541-558.
Fritts, D.C. and M. J. Alexander (2003), Gravity wave dynam-
ics and effects in the middle atmosphere,
Rev. Geophys. 41
(1),
1003.
Früh, W.G., and P.L. Read (1997), Wave interactions and the
transition to chaos of baroclinic waves in a thermally driven
rotating annulus,
R. Soc. Lond. Philos. Trans. Ser. A
,
355
,
101-153.
Fultz D., R.R. Long, G.V. Owens, W. Bohan, R. Kaylor and
J. Weil (1959), Studies of thermal convection in a rotating
cylinder with some implications for large-scale atmospheric
motions,
Meteorol Monogr. 4
(21), 1-104.
Gille. S. T. (1994), Mean sea surface height of the Antarc-
tic Circumpolar Current from GEOSAT data: Methods and
application,
J. Geophys. Res.
,
99
, 18,255-18,273.
Griffiths, R., and P. Linden (1981), The stability of buoyancy-
driven coastal currents.
Dyn. Atmos. Oceans
,
5
(4),
281-306.
Gula, J., and V. Zeitlin (2010), Instabilities of buoyancy-driven
coastal currents and their nonlinear evolution in the two-
layer rotating shallow-water model. Part 1. Passive lower layer,
J. Fluid Mech.
,
659
, 69-93.
Gula, J., R. Plougonven, and V. Zeitlin (2009a), Ageostrophic
instabilities of fronts in a channel in a stratified rotating fluid,
J. Fluid Mech.
,
627
, 485.
Gula, J., V. Zeitlin, and R. Plougonven (2009b), Instabilities
of two-layer shallow-water flows with vertical shear in the
rotating annulus,
J. Fluid Mech.
,
638
, 27.
Gula, J., V. Zeitlin, and F. Bouchut (2010), Instabilities of
buoyancy-driven coastal currents and their nonlinear evolu-
tion in the two-layer rotating shallow water model. Part 2.
Active lower layer,
J. Fluid Mech.
,
665
, 209-237.
Hart, J.E. (1972), A laboratory study of baroclinic instability.
Geophys. Astrophys. Fluid Dyn.
,
3
, 181-209.
Hart, J.E. (1973), On the behavior of large-amplitude baroclinic
waves,
J. Atmos. Sci.
,
30
, 1017-1034.
Hart J.E. (1976), The modulation of an unstable baroclinic wave
field,
J. Atmos. Sci.
,
33
, 1874-1889.
Hart, J. (1979), Finite amplitude baroclinic instability,
Ann. Rev.
Fluid Mech.
,
11
, 147-172.
Hart, J. (1980), An experimental study of nonlinear baroclinic
instability and mode selection in a large basin,
Dyn. Atmos.
Oceans
,
4
, 115-135.
Hart, J.E. (1981), Wavenumber selection in nonlinear baroclinic
instability,
J. Atmos. Sci.
,
38
, 400-408.
Hart, J.E. (1985), A laboratory study of baroclinic chaos on the
f-plane,
Tellus Ser. A
,
37
, 286.
Hart, J.E., and S. Kittelman (1986), A method for measuring
interfacial wave fields in the laboratory,
Geophys. Astrophys.
Fluid Dyn.
,
36
(2), 179-185.
Hayashi, Y., and W.R. Young (1987), Stable and unstable shear
modes on rotating parallel flows in shallow water,
J. Fluid
Mech.
,
184
, 477-504.
Hazel, P. (1972), Numerical studies of the stability of inviscid
stratified shear flows,
J. Fluid Mech.
,
51
, 39-61.
Hide, R. (1953), Some experiments on thermal convection in a
rotating liquid,
Q. J. R. Meteor. Soc.
,
79
(339), 161-161.
Hide, R. (1958), An experimental study of thermal convection
in a rotating liquid,
R. Soc. Lond. Philos. Trans. Ser. A
,
250
,
441-478.
Hide, R. (2011) Regimes of sloping thermal convection in a
rotating liquid “annulus,”
Geophys.Astrophys.FluidDyn.
,
105
,
11-127.
Hölmböe, J. (1962), On the behavior of symmetric waves in
stratified shear layers.
Geofys.Publ.
,
24
, 67-112.
Howard, L.N. (1961), Note on a paper of John W. Miles,
J. Fluid
Mech.
,
10
, 509-512.
Jacoby, T.N.L. (2012), Inertia-gravity wave generation by bound-
ary layer instabilities, Ph.D. thesis, University of Oxford,
Oxford.
Jacoby, T. N. L., P. L. Read, P. D. Williams, and R. M. B. Young,
(2011), Generation of inertia?gravity waves in the rotating
thermal annulus by a localised boundary layer instability,
Geoph. Astr. Fluid Dyn.
,
105
(2-3): 161-181.
King, J.C. (1979), An experimental study of baroclinic wave
interactions in a two-layer system,
Geophys. Astrophys. Fluid
Dyn.
,
13
, 153-167.
Lawrence, G.A., F.K. Browand, and L.G. Redekopp (1991),
The stability of a sheared density interface,
Phy. Fluids
,
3
,
2360-2370.
Lovegrove, A.F., P.L. Read, and C.J. Richards (1999), Genera-
tion of inertia-gravity waves by a time-dependent baroclinic
wave in the laboratory,
Phys. Chem. Earth B
,
24
, 455-460.
Lovegrove, A.F., P.L. Read, and C.J. Richards (2000), Genera-
tion of inertia-gravity waves in a baroclinically unstable fluid,
Q. J. R. Met. Soc.
,
126
, 3233-3254.
McIntyre, M.,E (2009), Spontaneous imbalance and hybrid
vortex-gravity structures,
J. Atmos. Sci.
,
66
, 1315-1325.
Miles, J.W. (1961), On the stability of heterogeneous shear flows,
J. Fluid Mech.
,
10
, 496-508.
Miles, J.W. (1963), On the stability of heterogeneous shear flows.
Part 2.
J. Fluid Mech.
,
16
, 209-227.
Olson, D.B. (1991), Rings in the ocean,
Ann. Rev. Earth Planet.
Sci.
,
19
, 283-311.
Ortiz, S., J. Chomaz, and T. Loiseleux, (2002), Spatial holmboe
instability,
Phys. Fluids
,
14
, 2585-2597.
O'sullivan, D., and T.J. Dunkerton (1995), Generation of
inertia-gravity waves in a simulated life cycle of baroclinic
instability,
J. Atmos. Sci.
,
52
, 3695-3716.
