@vanroekel I have two questions about the large-scale dissipation rate ($\epsilon_{ls}$) in the current ADC code:
- Why is $\epsilon_{ls}$ diagnosed using a tendency equation (
epstend) or through a simple $\epsilon_{ls}\propto KE^{3/2}/L$ closure, rather than by coupling it to the lateral entrainment/detrainment term (which Lappen and Randall say represents the transfer of energy from plume-scale to sub-plume scale turbulence)?
- This $\epsilon_{ls}$ term appears as a source in the sub-plume scale TKE budget, but why does it appear as a sink in the u2 and v2 budgets (multiplied by 2/3 in each budget)? Because of their large-scale and anisotropic dynamics, shouldn't most of the plume-scale energy be dissipated anisotropically through the lateral entrainment between plumes? I'm not sure how the energetic conservation between the plume-scale sinks and sub-plume scale sources of energy work when there is entrainment/detrainment of w2 and imposed dissipation of u2 and v2, but only the latter is fed into the sub-plume scale TKE sources?
The Lappen & Randall 2001 papers are not very clear about how they define the large-scale dissipation rate ($\epsilon_{ls}$; equivalent to the rate of energy transfer/cascade from plume-scale to sub-plume-scale motions). This dissipation rate appears in the sub-plume scale TKE budgets in their second paper (calculated separately for upwelling and downwelling plumes):
Despite not explicitly defining this dissipation rate, they discuss in the first paper that the entrainment/detrainment term represents the transfer of plume-scale TKE to sub-plume scale TKE. This suggests that $\epsilon_{ls}$ should be equal to the entrainment/detrainment term in the w2 budget multiplied by 1/2 to convert to kinetic energy (or perhaps 1/6 if it is assumed to act equally on u2 and v2 as well). With $\epsilon_{ls}$ partitioned between upwelling and downwelling sub-plume TKE budgets as,
@vanroekel I have two questions about the large-scale dissipation rate ($\epsilon_{ls}$ ) in the current ADC code:
epstend) or through a simple $\epsilon_{ls}\propto KE^{3/2}/L$ closure, rather than by coupling it to the lateral entrainment/detrainment term (which Lappen and Randall say represents the transfer of energy from plume-scale to sub-plume scale turbulence)?The Lappen & Randall 2001 papers are not very clear about how they define the large-scale dissipation rate ($\epsilon_{ls}$ ; equivalent to the rate of energy transfer/cascade from plume-scale to sub-plume-scale motions). This dissipation rate appears in the sub-plume scale TKE budgets in their second paper (calculated separately for upwelling and downwelling plumes):
$\epsilon_{ls}$ should be equal to the entrainment/detrainment term in the w2 budget multiplied by 1/2 to convert to kinetic energy (or perhaps 1/6 if it is assumed to act equally on u2 and v2 as well). With $\epsilon_{ls}$ partitioned between upwelling and downwelling sub-plume TKE budgets as,
Despite not explicitly defining this dissipation rate, they discuss in the first paper that the entrainment/detrainment term represents the transfer of plume-scale TKE to sub-plume scale TKE. This suggests that