Barotropy: Difference between revisions

Latest revision as of 12:19, 26 March 2024

The state of a fluid in which surfaces of constant density (

or temperature) are coincident with surfaces of constant pressure; it is the state of zero baroclinity.
Mathematically, the equation of barotropy states that the gradients of the density and pressure fields are proportional:

where ρ is the density, p the pressure, and B a function of thermodynamic variables, called the coefficient of barotropy. With the equation of state, this relation determines the spatial distribution of all state parameters once these are specified on any surface. For a homogeneous atmosphere, B = 0; for an atmosphere with homogeneous potential temperature,

where c_v and c_p are the specific heats at constant volume and pressure, respectively, R the gas constant, and T the Kelvin temperature; for an isothermal atmosphere, B = 1/(RT). It is not necessary that a fluid that is barotropic at the moment will remain so, but the implication that it does often accompanies the assumption of barotropy (
see autobarotropic). In this sense the assumption, or a modification thereof, is widely applied in dynamic meteorology. The important consequences are that absolute vorticity is conserved (to the extent that the motion is two dimensional), and that the geostrophic wind has no shear with height.
See equivalent barotropic model, barotropic vorticity equation, barotropic instability, barotropic disturbance.
Holton, J. R. 1992. An Introduction to Dynamic Meteorology. 3d edition, Academic Press, . p. 77.

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+{{Term
+|Display title=barotropy
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+|Definitions={{Definition
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+|Meaning=The state of a fluid in which surfaces of constant [[density]] (
-<div class="termentry">
+|Explanation=''or'' [[temperature]]) are coincident  with surfaces of constant [[pressure]]; it is the state of zero [[baroclinity]].<br/> Mathematically, the [[equation of barotropy]] states that the [[gradients]] of the density and pressure  fields are proportional:    <blockquote>[[File:ams2001glos-Be6.gif|link=|center|ams2001glos-Be6]]</blockquote>    where &#x003c1; is the density, ''p'' the pressure, and ''B'' a function of thermodynamic variables, called the  [[coefficient of barotropy]]. With the [[equation of state]], this relation determines the spatial distribution  of all state parameters once these are specified on any surface. For a [[homogeneous atmosphere]],  ''B'' = 0; for an [[atmosphere]] with homogeneous [[potential temperature]],    <blockquote>[[File:ams2001glos-Be7.gif|link=|center|ams2001glos-Be7]]</blockquote>    where ''c''<sub>''v''</sub> and ''c''<sub>''p''</sub> are the [[specific heats]] at constant volume and pressure, respectively, ''R'' the [[gas constant|gas  constant]], and ''T'' the Kelvin temperature; for an [[isothermal atmosphere]], ''B'' = 1/(''RT''). It is not  necessary that a fluid that is [[barotropic]] at the moment will remain so, but the implication that  it does often accompanies the assumption of barotropy (<br/>''see'' [[autobarotropic]]). In this sense the  assumption, or a modification thereof, is widely applied in [[dynamic meteorology]]. The important  consequences are that [[absolute vorticity]] is conserved (to the extent that the motion is two dimensional),  and that the [[geostrophic wind]] has no [[shear]] with height. <br/>''See'' [[equivalent barotropic model|equivalent barotropic  model]], [[barotropic vorticity equation]], [[barotropic instability]], [[barotropic disturbance]].<br/> Holton, J. R. 1992. An Introduction to Dynamic Meteorology. 3d edition, Academic Press, . p. 77.
-  <div class="term">
+}}
-== barotropy ==
+}}
-  </div>
-<div class="definition"><div class="short_definition">The state of a fluid in which surfaces of constant [[density]] (<br/>''or'' [[temperature]]) are coincident  with surfaces of constant [[pressure]]; it is the state of zero [[baroclinity]].</div><br/> <div class="paragraph">Mathematically, the [[equation of barotropy]] states that the [[gradients]] of the density and pressure  fields are proportional:    <div class="display-formula"><blockquote>[[File:ams2001glos-Be6.gif|link=|center|ams2001glos-Be6]]</blockquote></div>    where &#x003c1; is the density, ''p'' the pressure, and ''B'' a function of thermodynamic variables, called the  [[coefficient of barotropy]]. With the [[equation of state]], this relation determines the spatial distribution  of all state parameters once these are specified on any surface. For a [[homogeneous atmosphere]],  ''B'' = 0; for an [[atmosphere]] with homogeneous [[potential temperature]],    <div class="display-formula"><blockquote>[[File:ams2001glos-Be7.gif|link=|center|ams2001glos-Be7]]</blockquote></div>    where ''c''<sub>''v''</sub> and ''c''<sub>''p''</sub> are the [[specific heats]] at constant volume and pressure, respectively, ''R'' the [[gas  constant]], and ''T'' the Kelvin temperature; for an [[isothermal atmosphere]], ''B'' = 1/(''RT''). It is not  necessary that a fluid that is [[barotropic]] at the moment will remain so, but the implication that  it does often accompanies the assumption of barotropy (<br/>''see'' [[autobarotropic]]). In this sense the  assumption, or a modification thereof, is widely applied in [[dynamic meteorology]]. The important  consequences are that [[absolute vorticity]] is conserved (to the extent that the motion is two dimensional),  and that the [[geostrophic wind]] has no [[shear]] with height. <br/>''See'' [[equivalent barotropic  model]], [[barotropic vorticity equation]], [[barotropic instability]], [[barotropic disturbance]].</div><br/> </div><div class="reference">Holton, J. R. 1992. An Introduction to Dynamic Meteorology. 3d edition, Academic Press, . p. 77. </div><br/>
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-[[Category:Terms_B]]