The Vorticity-Velocity Gradient Cofactor Tensor and the Material Invariant of the Semigeostrophic Theory.

Abstract A new derivation and interpretation of the semigeostrophic (SG) material invariant in the theory of geophysical flows is introduced. First, a generalized three-dimensional equation of the SG dynamics is established and the generalized equations for the rate of change of vorticity and for the rate of change of the velocity gradient cofactor tensor are obtained. Next, a conservation equation for the vorticity–velocity gradient cofactor tensor (denoted Ξ) is derived. The specific potential Ξ, that is, Ξ in the reference configuration per unit of mass, is defined and an expression for its rate of change is obtained. The SG invariant is interpreted as the vertical component of the specific potential Ξ. Under the SG assumptions (advection of the geostrophic velocity, hydrostatic, and f-plane approximations) this vertical component is materially conserved in the SG flow. The generalized SG invariant (i.e., the specific potential Ξ) differs conceptually from the Beltrami–Rossby–Ertel specific potent...

[1]  S. Reich,et al.  Vorticity and symplecticity in Lagrangian fluid dynamics , 2005 .

[2]  M. Ehrendorfer A Vector Derivation of the Semigeostrophic Potential Vorticity Equation. , 2004 .

[3]  A. Viudez,et al.  Potential Vorticity and the Quasigeostrophic and Semigeostrophic Mesoscale Vertical Velocity , 2004 .

[4]  A. Viudez A New Interpretation of the Beta Term in the Vorticity Equation , 2003 .

[5]  Miroslav Šilhavý,et al.  The Mechanics and Thermodynamics of Continuous Media , 2002 .

[6]  A. Viudez The Relation between Beltrami's Material Vorticity and Rossby–Ertel's Potential Vorticity , 2001 .

[7]  A. Viudez On Ertel's Potential Vorticity Theorem. On the Impermeability Theorem for Potential Vorticity , 1999 .

[8]  H. Volland Geophysical Hydrodynamics and Ertel's Potential Vorticity (Selected Papers of Hans Ertel): Schröder W. (ed.), 1991, 218 pp. International Commission of History of IAGA, Bremen-Rönnebeck, DM 20 pb , 1993 .

[9]  W. Schubert,et al.  Semigeostrophic Theory on the Hemisphere , 1991 .

[10]  P. M. Naghdi,et al.  On the Lagrangian description of vorticity , 1991 .

[11]  G. Shutts Angular Momentum Coordinates and Their Use in Zonal, Geostrophic Motion on a Hemisphere , 1980 .

[12]  B. Hoskins,et al.  The Forcing of Ageostrophic Motion According to the Semi-Geostrophic Equations and in an Isentropic Coordinate Model , 1977 .

[13]  Brian J. Hoskins,et al.  The Geostrophic Momentum Approximation and the Semi-Geostrophic Equations. , 1975 .

[14]  R. Fjørtoft ON THE INTEGRATION OF A SYSTEM OF GEOSTROPHICALLY BALANCED PROGNOSTIC EQUATIONS , 1961 .

[15]  M. Iudin Invariant Quantities in Large Scale Atmospheric Processes , 1960 .

[16]  A. A. White,et al.  Large-Scale Atmosphere–Ocean Dynamics: A view of the equations of meteorological dynamics and various approximations , 2002 .