Brunt-väisälä frequency: Difference between revisions

Latest revision as of 22:20, 13 January 2024

Brunt–Väisälä frequency

The frequency N at which a displaced air parcel will oscillate when displaced vertically within a statically stable environment.
It is given as

where g = 9.8 m s^-1 is gravitational acceleration, θ_υa is the ambient virtual potential temperature, and ∂θ_υa/∂z is the vertical gradient of the ambient virtual potential temperature. Units are radians per second, although this is usually abbreviated as s^-1. This frequency is not defined in statically unstable air and is zero in statically neutral air. The frequency of internal gravity waves in the atmosphere cannot exceed the local Brunt–Väisälä frequency. This frequency is also sometimes used as a measure of the stability within a statically stable environment.

See also buoyancy frequency.
Reference:Stull, R. B. 1995. Meteorology Today for Scientists and Engineers. 385 pp.

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 == Brunt&ndash;V&#x000e4;is&#x000e4;l&#x000e4; frequency ==
-<div class="definition"><div class="short_definition">The [[frequency]] ''N'' at which a displaced [[air parcel]] will oscillate when  displaced vertically within a [[static stability|statically stable]] environment.</div><br/> <div class="paragraph">Given as    <div class="display-formula"><blockquote>[[File:Brunt_V_final.png‎|150px|center]]</blockquote></div>    where ''g'' = 9.8 m s<sup>-1</sup> is gravitational [[acceleration]], ''&#x003b8;''<sub>''va''</sub> is the ambient virtual potential temperature, and &part;''&#x003b8;''<sub>''va''</sub>/&part;''z'' is the vertical [[gradient]] of the ambient [[virtual potential temperature]]. Units are radians per second,  although this is usually abbreviated as s<sup>-1</sup>. This frequency is not defined in statically [[unstable air]]  and is zero in statically neutral air. The frequency of internal [[gravity waves]] in the [[atmosphere]]  cannot exceed the local Brunt&ndash;V&#x000e4;is&#x000e4;l&#x000e4; frequency. This frequency is also sometimes used as a measure  of the [[stability]] within a statically stable environment.</div><br/> </div>
+The [[frequency]] ''N'' at which a displaced [[air parcel]] will oscillate when  displaced vertically within a [[static stability|statically stable]] environment.<br/> It is given as    <blockquote>[[File:Brunt_V_final.png‎|170px|center]]</blockquote>    where ''g'' = 9.8 m s<sup>-1</sup> is gravitational [[acceleration]], ''&#x003b8;''<sub>''&#965;a''</sub> is the ambient virtual potential temperature, and &part;''&#x003b8;''<sub>''&#965;a''</sub>/&part;''z'' is the vertical [[gradient]] of the ambient [[virtual potential temperature]]. Units are radians per second,  although this is usually abbreviated as s<sup>-1</sup>. This frequency is not defined in statically [[unstable air]]  and is zero in statically neutral air. The frequency of internal [[gravity waves]] in the [[atmosphere]]  cannot exceed the local Brunt&ndash;V&#x000e4;is&#x000e4;l&#x000e4; frequency. This frequency is also sometimes used as a measure  of the [[stability]] within a statically stable environment.<br/>
-<div class="definition"><div class="short_definition"><br/>''See also'' [[buoyancy frequency]].</div><br/>Reference:</div><div class="reference">Stull, R. B. 1995. Meteorology Today for Scientists and Engineers. 385 pp. </div><br/>
+<br/>''See also'' [[buoyancy frequency]].<br/>Reference:Stull, R. B. 1995. Meteorology Today for Scientists and Engineers. 385 pp. <br/>
 ''term edited 15 Dec 2014''
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