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Vorticity. Measure of angular momentum for a fluid Tendency of a parcel to rotate Two components of vorticity relative (angular momentum in rotating frame) planetary (rotation of the frame) Important for understanding western boundary currents. Relative Vorticity. Positive Negative.
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Vorticity • Measure of angular momentum for a fluid • Tendency of a parcel to rotate • Two components of vorticity • relative (angular momentum in rotating frame) • planetary (rotation of the frame) • Important for understanding western boundary currents
Relative Vorticity Positive Negative • Relative vorticity, z, is driven by shears in the flow field
Relative Vorticity Positive Negative Negative Positive anti-cyclonic cyclonic
The Sign of Vorticity Negative Positive anti-cyclonic cyclonic
North y or v direction Relative Vorticity Positive Negative East x or u direction • Relative vorticity is defined as z = Dv/Dx - Du/Dy
Example of Relative Vorticity • Northward velocity increases as a function of x distance (@ 34oN) • Relative vorticity is positive North y or v direction 10 cm/s East x or u direction 500 km
Relative Vorticity • Relative vorticity is defined as z = Dv/Dx - Du/Dy = Dv/Dx • Change in Dv is 0.1 m/s for Dx = 500 km • Relative vorticity (z) = Dv/Dx = (0.1 m / s) / (500x103 m) = 2x10-7 s-1
Another Example • Eastward velocity decreases as a function of y (north) distance 10 cm/s North y or v direction 500 km East x or u direction
Relative Vorticity • Relative vorticity is defined as z = Dv/Dx - Du/Dy = - Du/Dy • Change in Du is 0.1 m/s for Dy = 500 km • Relative vorticity (z) = - Du/Dy = - (- 0.1 m / s) / (500x103 m) = 2x10-7 s-1
+ + Relative Vorticity • Relative vorticity, z = Dv/Dx - Du/Dy Dv/Dx > 0 -> z > 0 Du/Dy < 0 -> z > 0 cyclonic vorticity
- - Relative Vorticity • Relative vorticity, z = Dv/Dx - Du/Dy Dv/Dx < 0 -> z < 0 Du/Dy > 0 -> z < 0 anti-cyclonic vorticity
Planetary Vorticity • The planet also rotates about its axis • Objects are affected by both planetary & relative vorticity components • Planetary vorticity = 2 W sin f (= f) 2 W @ north pole 0 on equator - 2 W @ south pole
Example for Planetary Vorticity • Planetary vorticity = 2 W sin f (= f) • At 34oN, f = 2 W sin 34o = 8.2x10-5 s-1 • Previous examples -> z = 2x10-7 s-1 • Ratio of |z| / f = (2x10-7 s-1)/(8.2x10-5 s-1) = 0.0025 • Relative vorticity is small compared with f except near equator (Rossby number)
Total Vorticity • Only the total vorticity (f + z) is significant • For flat bottom ocean with uniform r & no friction, total vorticity (f + z) is conserved • Coffee cup example… • Water transported north will decrease its z to compensate for changes in f • Water advected south will increase its z
Potential Vorticity • Potential vorticity = (f + z) / D
Potential Vorticity • Potential vorticity = (f + z) / D • PV is conserved except for friction • If f increases, a water mass can spin slower (reduce z) or increase its thickness • Typically, PV is approximated as f/D (z << f) • Used to map water mass distributions & assess topographic steering
Potential Vorticity WOCE Salinity P16 150oW
Potential Vorticity WOCE PV P16 150oW PV~f/D
Potential Vorticity PV on sq = 25.2
D U Topographic Steering • Potential vorticity = (f + z) / D ~ f / D • Uniform zonal flow over a ridge • Let D decreases from 4000 to 2000 m • If PV = constant, f must decrease by 2, leading to a equatorward deflection of current • This is topographic steering
Topographic Steering Plan view (NH)
Topographic Steering • A factor of two reduction in f • For 30oN, f = 7.29x10-5 s-1 • f/2 = 3.6x10-5 s-1 which corresponds to a latitude of 14.5oN • Displacement = (30-14.5o)*(111 km/olat) = 1700 km • Water column is really stratified which reduces the changes of D & thereby f
Topographic Steering Basically f/H
Vorticity • Measure of the tendency of a parcel to rotate • Relative (= z rotation viewed from Earth frame) • Planetary (= f rotation of the frame) • Total (z + f) & potential vorticity (z + f) / D are relevant dynamically • Important for diagnosing water mass transport & western intensification...
Western Intensification • Subtropical gyres are asymmetric & have intense WBC’s • Western intensification is created by the conservation of angular momentum in gyre • Friction driven boundary current is formed along the western sidewall • Maintains the total vorticity of a circulating water parcel
Wind Driven Gyres Symmetric gyre
Wind Torque in Gyres Need process to balance the constant addition of negative wind torque Curl of the wind stress…
Stommel’s Experiments • Model of steady subtropical gyre • Includes rotation and horizontal friction f = constant f = 2W sinf
Stommel’s Experiments • Stommel showed combination of horizontal friction & changes in Coriolis parameter lead to a WBC • Need to incorporate both ideas into an explanation of western intensification
Western Intensification • Imagine a parcel circuiting a subtropical gyre • As a parcel moves, it gains negative vorticity (wind stress curl) • Gyre cannot keep gaining vorticity or it will spin faster and faster • Need process to counteract the input of negative vorticity from wind stress curl
Western Intensification • Conservation of potential vorticity (f + z)/D Assume depth D is constant (barotropic ocean) Friction (i.e., wind stress curl) can alter (f + z) • In the absence of friction Southward parcels gain z to compensate reduction in f Northward parcels lose z to compensate increase in f
Western Intensification • Friction plays a role due to wind stress curl (input of -z) sidewall friction (input of +z) + + WBC EBC
Western Intensification • In a symmetric gyre, Southward: wind stress input of -z is balanced +z inputs by D’s in latitude & sidewall friction Northward: D’s in latitude result in an input of -z along with the wind stress input of -z This is NOT balanced by + z by sidewall friction Need an asymmetric gyre to increase sidewall friction in the northward flow!!
Western Intensification • In a symmetric gyre, Southward: wind stress input of -z is balanced +z inputs by D’s in latitude & sidewall friction Northward: D’s in latitude result in an input of -z along with the wind stress input of -z This is NOT balanced by + z by sidewall friction Need an asymmetric gyre to increase sidewall friction in the northward flow!!
Western Intensification • In a asymmetric gyre, Southward: wind stress input of -z is balanced +z inputs by D’s in latitude & sidewall friction Northward: D’s in latitude result in an input of -z along with the wind stress input of -z This IS balanced by LARGE +z from sidewall friction Total vorticity balance is satisfied & we have an asymetric gyre
Role of Wind Stress Curl • Spatial D’s in wind stress control where Ekman transports converge • Where changes in tw = 0, the convergence of Ekman transports = 0 • This sets the boundaries of gyres • My = 1/(Df/Dy) curl tw = (1/b) curl tw -> Sverdrup dynamics
Western Intensification • Intense WBC’s create a source of positive vorticity that maintains total vorticity balance • Creates asymmetric gyres & WBC’s • Boundary currents are like boundary layers • Wind stress curl & D’s in Coriolis parameter with latitude are critical elements • Can be extended to quantitatively predict water mass transport (Sverdrup theory)
