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Blocking in areas of complex
topography
Mimi Hughes
Alex Hall
Rob Fovell
UCLA
and its influence on
rainfall distribution
Orographic enhancement and blocking: heavy precipitation during Northern California New Year’s floods of 1997 was almost entirely due to the interaction of the flow with topography (see Galewsky and Sobel, 2005)
Rain in Southern California
How can topography change the distribution of precipitation?
Flow over?(mechanical lifting…)
Precipitation (grayscale) and topography (contours) for an idealized numerical study. From Jiang (2003)
Win
d
As air moves over topography it is forced to rise, causing moisture to condense and fall out:
P: PrecipitationqU: Moisture fluxh(x,y): Terrain
See Smith (1979), Roe (2005), etc.€
P ∝ qU • ∇h(x,y)
As air moves over topography it is forced to rise, causing moisture to condense and fall out:
P: PrecipitationqU: Moisture fluxh(x,y): Terrain
See Smith (1979), Roe (2005), etc.€
P ∝ qU • ∇h(x,y)
Flow over?(mechanical lifting…)
Precipitation (grayscale) and topography (contours) for an idealized numerical study. From Jiang (2003)
Is this too simple?
Win
d
Or Flow around?(aka blocked flow)
Precipitation (grayscale) and topography (contours) for an idealized numerical study. From Jiang (2003)
If the air approaching a barrier does not have enough kinetic energy to surmount it, the flow will be blocked (Smolarkiewicz and Rotunno, 1990; Pierrehumbert and Wyman, 1985). This can enhance precipitation upwind of the barrier.
Win
d
Case studies: Blocking influencing precipitation
• Medina and Houze (2003) compared two synoptic events during the mesoscale alpine program and found a substantial difference in precipitation and wind between them. – Less stable, higher wind speed case => winds uniform
with height and precipitation greatly enhanced on the windward slope
– More stable, lower wind speed case => wind shear in the lowest layers and precipitation more evenly distributed
• Neiman et. al. (2004) found that orographic blocking affected the propagation of the fronts during a storm from the 1997/98 season, substantially impacting the distribution of precipitation
Motivation:
Approach:
To investigate what processes are essential to predicting the distribution of precipitation in complex topography
Systematic study using a hierarchy of models
Study Region: Why California?
Topography
Shuttle Radar Topography Mission elevation shown as shaded relief
Precipitation observations
Cooperative Observation Precipitation measurements: average of daily rainfall from May 1995 to April 2006. Black contours show topography.
Winds during rain
Vectors show wind speed and direction; colored contours show wind speed in m/s.
Coastal zone
Cooperative Observation Precipitation measurements: average of daily rainfall from May 1995 to April 2006. Black contours show topography.
Solid line shows linear regression. Large pale blue bullet is GPCP open-ocean average (119.5W-121.5W, 31.5N-32.5N)
Upslope Model?
Questions I’ll address…
• Does orographic blocking occur during raining hours in Southern California?
• Does blocking significantly impact the climatological distribution of precipitation?
• Is there a simple way to get a quantitative estimate of the impact of blocking on precipitation?
Data
• release 3.6.0
• boundary conditions: Eta model analysis
• resolution:
• domain 1: 54 km, domain 2: 18 km, domain 3: 6 km
• 23 vertical levels.
• time period: May 1995 to April 2006 (re-initialized every 3 days)
• Parameterizations:
• MRF boundary layer
• Simple ice microphysics
• Clear-air and cloud radiation
• Kain-Fritsch 2 cumulus parameterization in coarse domains, only explicitly resolved convection in 6 km domain
MM5 Configuration
One can think of this as a reconstruction of weather conditions over this time period consistent with three constraints: (1) our best guess of the large-scale conditions, (2) the physics of the MM5 model, and (3) the prescribed topography, consistent with model resolution.
• release 3.6.0
• boundary conditions: Eta model analysis
• resolution:
• domain 1: 54 km, domain 2: 18 km, domain 3: 6 km
• 23 vertical levels.
• time period: May 1995 to April 2006 (re-initialized every 3 days)
• Parameterizations:
• MRF boundary layer
• Simple ice microphysics
• Clear-air and cloud radiation
• Kain-Fritsch 2 cumulus parameterization in coarse domains, only explicitly resolved convection in 6 km domain
MM5 Configuration
Model Validation: Precipitation
Model Validation: Precipitation
Spatial Correlation: 0.87Regression: slope = 1.13 intercept = 0.39 cm/month
Model Validation: Winds
Correlation of simulated and observed daily mean wind anomalies at 18 stations. From Conil and Hall (2006)
Diagnosing Blocking
Brunt-Väisälä frequency:Depends on the moisture content of the atmosphere. When not saturated:
When close to saturation (Durran and Klemp, 1982):
€
N d2=
g
θv
∂θv
∂t
€
Nm2 =
g
T
∂T
∂z+ Γm
⎛
⎝ ⎜
⎞
⎠ ⎟ 1+
Lq
RdT
⎛
⎝ ⎜
⎞
⎠ ⎟−
g
1+ q
∂q
∂z
Computing a bulk Froude number
€
Fr2 =U 2
N 2h2
Average open ocean wind speed
Barrier height: 1 km
Composite maps of normalized precipitation rate for rainy hours binned by Fr2.
Separation by Fr2:Precipitation
€
Fr2 =U 2
N 2h2
Separation by Fr2:Precipitation
€
Fr2 =U 2
N 2h2
How are the Froude number and the distribution of precipitation related?
Adapted from Roe (2005)
High U2
Small N2
High Fr2
€
Fr2 =U 2
N 2h2
Low Fr2
Adapted from Jiang (2003)
Low U2
Large N2
€
Fr2 =U 2
N 2h2
Vectors show wind speed and direction, normalized by open-ocean speed.
Separation by Fr2:Surface winds
Vectors show normalized wind speed and direction; colored contours show normalized wind speed.
Separation by Fr2:Surface winds
Separation by Fr2:Percentage of precipitation
Quantifying the effect of blocking on precipitation
Linear model of orographic precipitation
Relates the precipitation to the gradient of the terrain, with the additional complexity of three shifting terms to account for upstream tilted vertically propagating gravity waves, and advection of water droplets during condensation and fallout.
(Smith 2003, Smith and Barstad 2004)
€
ˆ P (k, l) =Cwiσ ˆ h (k, l)
(1− imHw )(1+ iτ c )(1+ iτ f )
€
ˆ P (x, y) = max(F−1 ˆ P (k, l)[ ],0)
In Fourier space:
Linear model of orographic precipitation
Fourier transform of the terrain.
Moisture coefficient
Intrinsic frequency
Depth of moist layer
Hydrometeor fallout time
Moisture conversion time
Vertical wavenumber
€
ˆ h (k, l)
€
σ =Uk + Vl
€
Hw
€
τ f
€
τ c
€
m
€
Cw
Linear model of orographic precipitation
Relates the precipitation to the gradient of the terrain, with the additional complexity of three shifting terms to account for upstream tilted vertically propagating gravity waves, and advection of water droplets during condensation and fallout.
(Smith 2003, Smith and Barstad 2004)
In Fourier space:
Where is the Fourier transform of the terrain. The inverse transform of gives the spatial distribution of precipitation once negative values are truncated and background rate is added.
€
ˆ P (k, l) =Cwiσ ˆ h (k, l)
(1− imHw )(1+ iτ c )(1+ iτ f )
€
ˆ h (k, l)
€
ˆ P (k, l)
Linear model of orographic precipitation
Linear model: applied
Precipitation distribution predicted by the Linear Model (LM) and the MM5 composite for the conditionally unstable hours.
Linear model:
applied
Spatial Correlation = 0.83
Precipitation distribution predicted by the Linear Model (LM) and the MM5 composite for the conditionally unstable hours.
Linear model:
limitation
Precipitation distribution predicted by the LM and the MM5 composite for the hours with lowest Fr2.
Extent to which blocking affects precipitation distribution
Spatial correlation of the LM with MM5 precipitation for different ranges of Fr2
Extent to which blocking affects precipitation distribution
Regression lines of MM5 precipitation/slope relationship for different ranges of Fr2.
Summary
We use a hierarchy of models to identify the processes essential for predicting precipitation distribution in complex topography.
– Upstream blocking significantly modifies precipitation distribution in Southern California, contributing a substantial percentage of total precipitation, particularly at low elevation coastal locations.
– Defining a bulk Froude number based on the ambient atmospheric conditions provides a useful measure of the extent to which blocking is affecting precipitation distribution.
Exclusion of blocking effects is the main shortcoming of the linear model (LM), and including a term based on bulk Fr2 might make the LM accurate for all cases.
Applications
• The large-scale Fr2 can constrain the relationship between slope and rainfall for use in:– Statistical downscaling techniques– Statistical interpolation schemes (e.g., PRISM)
• Expect these findings to apply for other regions, particularly those which have complex topography next to a large region of moist but stable air (e.g., most of the coast of North America and the central coast of South America).
Thanks!
Future/Concurrent work
QuickTime™ and aTIFF (Uncompressed) decompressor
are needed to see this picture.
Investigation of the large scale conditions associated with and local scale response to the Santa Ana Winds…