Atmospheric Physics Computational Models and Data...
Transcript of Atmospheric Physics Computational Models and Data...
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1Joseph J. Trout, Ph.D.Joseph J. Trout, Ph.D.Drexel UniversityDrexel [email protected]@drexel.edu610-348-6495610-348-6495
Atmospheric Physics Computational Models and Data Analysis
A Presentation to the Physics Department at the Richard Stockton State College of New JerseyWednesday, 2 March 2011
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I.I. A Short Course on Atmospheric PhysicsA Short Course on Atmospheric PhysicsII.II. ERICA Aircraft DataERICA Aircraft DataIII.III. Cyclone ModelsCyclone ModelsIV.IV. LAMPS90 NWP Model SimulationsLAMPS90 NWP Model SimulationsV.V. Data Analysis - WaveletsData Analysis - Wavelets
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A Short Course on Atmospheric Physics
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Terminology:
Front:
A front may be defined as a sloping zone of pronounced transition in the thermal and wind fields. Consequently, they are characterized by a combination of:
A. Large Static Stability B. Large Horizontal Temperature Gradient . C. Absolute Vorticity ( horizontal wind shear). D. Vertical Wind Shear.
When depicted on a quasi-horizontal surfaces, fronts appear as long, narrow features in which the the along front scale is typically an order of magnitude greater than the across front scale. ( 1000-2000 km versus 100-200 km). (Keyser, 1986)
10 km≈6.21miles
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Terminology:
Front:
A front is an "elongated" zone of "strong" temperature gradient and relatively large static stability and cyclonic vorticity.(Bluestein, 1986)
10 km≈6.21miles
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Terminology:
Front:A front is an "elongated" zone of "strong" temperature gradient and relatively large static stability and cyclonic vorticity.(Bluestein, 1986)
●Strong - At least an order of magnitude greater than the synoptic scale value of 10 K/ 1000 km.●Elongated - A zone whose length is roughly half an order of magnitude greater than its width.●Static Stability - Buoyancy forces and gravitational forces lead to decelerating a parcel's upward motion●Cyclonic Vorticity - The curl (turning) of the wind with counter clockwise cyclonic circulation around a low in N. H. being positive.
10 km≈6.21miles
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Zero Order Model
First Order Model
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Cold Front – “Cold” Air Mass Replaces “Warm” Air Mass.
Terminology:
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Cold Front – “Cold” Air Mass Replaces “Warm” Air Mass.
Terminology:
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Cold-Type Occlusion – Air behind advancing cold front colder than cool air ahead of warm front
Terminology:
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Warm-Type Occlusion – Air behind the advancing cold front is not as cold as the air ahead of the warm front.
Terminology:
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East
North
Up
V windV wind
V wind= x i+ y j+ z kV wind=u i+v j+ω k
Terminology:
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Warm ColdFront
Actual Wind
FrontNormal Component
FrontParallel Component
i
j
Terminology:
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Terminology:
Vorticity :
Defined as the curl of a vector. It is the rotation of air around a vertical axis.
∇ X V=( i ∂∂ x
+ j ∂∂ y
+k ∂∂ y )X (u i+v j+ω k )
∇ X V=ξ i+η j+ζ k
ξ=∂ v∂ x
−∂u∂ y
≈−∂u∂ y
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Terminology:
Convergence (Divergence) :Convergence - The winds result in a net inflow of air. Generally associate this type of convergence with low-pressure areas, where convergence of winds toward the center of the low results in an increase of mass into the low and an upward motion.
Divergence – The winds produce a net flow of air outward. Generally associated with high-pressure cells, where the flow of air is directed outward from the center, causing a downward motion.
∇H⋅V=( i ∂∂ x
+ j ∂∂ y )⋅(u i+v j )
∇ H⋅V=(∂u∂ x
+∂ v∂ y )≈ ∂ v
∂ y
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Terminology:
Virtual Temperature:
Virtual Temperature takes into account the moisture dependence of an air parcel. Virtual Temperature is the temperature that makes the ideal gas equation correct when considering moist air.
T v=(1+0.6q )T
T v=Virtual Temperatureq=Mixing Ratio=Ratio of mass of water vapor to mass of dry air.T=TemperaturePV=nRT Ideal Gas Law
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Terminology:
Potential Temperature:
Potential Temperature is the temperature an air parcel would have if it were bought adiabatically to a reference pressure of 1000mb.
θ≈T (Po
P )R /cp
θ=Potential TemperatureT= Temperature of the Air ParcelPo=Reference Pressure (1000mb )P= Pressure of the Air ParcelR= Universal Gas ConstantC P= Specific Heat at Constant Pressure
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Terminology:
Equivalent Potential Temperature:
Equivalent Potential Temperature is the temperature an air parcel would have if it were bought adiabatically to a reference pressure of 1000mb and all the moisture condensed out and the latent heat used to warm the parcel.
θe≈θe(LC q s
C PT )θe=Equivalent Potential Temperatureθ=Potential TemperatureT= Temperature of the Air ParcelR= Universal Gas ConstantC P= Specific Heat at Constant Pressure
q s=Saturation Mixing Ratio =621.97( es
P−e s)
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Experiment on Rapidly Intensifying Cyclones over the Atlantic (ERICA)
Data collected by aircraft.
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This is what I want.
Front
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This is what I received.
Front
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0 20 40 60 80 100 120 1400
2
4
6
8
10
12
14
Virtual Temperature
Distance Through Front [ km ]
Tem
pera
ture
[ o
C ]
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0 20 40 60 80 100 120 140276
278
280
282
284
286
288
290
Potential Temperature
Distance Through Front [ km ]
Tem
pera
ture
[K ]
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0 20 40 60 80 100 120 140286
291
296
301
306
311
Equivalent Potential Temperature
Distance Through Front [ km ]
Tem
pera
ture
[K ]
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0 20 40 60 80 100 120 1400
2
4
6
8
10
12
14
16
18
20
East-West Wind - E102131E
Distance Through Front [km]
Win
d [m
/s]
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0 20 40 60 80 100 120 140
-30
-20
-10
0
10
20
30
40
North-South Wind - E102131E
Distance Through Front [km]
Win
d [m
/s]
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Cyclone Models
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Stages in the Life Cycle of a Mid-latitude Wave Cyclone
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Life Cycle of a Wave Cyclone
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Life Cycle of a Wave Cyclone
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Life Cycle of a Wave Cyclone
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Life Cycle of a Wave Cyclone
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Life Cycle of a Wave Cyclone
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Life Cycle of a Wave Cyclone
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Cloud Patterns – Mature Wave Cyclone
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Limited Area Mesoscale Prediction System
(LAMPS 90)
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Conservation of Horizontal Momentum∂u∂ t =(−u ∂u
∂ x−v ∂u∂ y−w ∂u
∂ z )−1ρ
∂ P∂ y + fv+uv
r etan α+ ∂u
∂ t conv+∂u
∂ t s∂ v∂ t =(−u ∂ v
∂ x−v ∂ v∂ y−w ∂v
∂ z )−1ρ
∂P∂ y + fu+u2
retan α+ ∂v
∂ t conv+ ∂v
∂ t si . ii . iii . iv . v . vii .vi .
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Conservation of Horizontal Momentum∂u∂ t =(−u ∂u
∂ x−v ∂u∂ y−w ∂u
∂ z )−1ρ
∂ P∂ y + fv+uv
r etan α+ ∂u
∂ t conv+∂u
∂ t s∂ v∂ t =(−u ∂ v
∂ x−v ∂ v∂ y−w ∂v
∂ z )−1ρ
∂P∂ y + fu+u2
retan α+ ∂v
∂ t conv+ ∂v
∂ t s
i. local time changeii. advectioniii. pressure gradient forceiv. Coriolis forcev. curvature termvi. convective transportvii. eddy transport
i . ii . iii . iv . v . vii .vi .
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Conservation of Vertical Momentum∂w∂ t =(−u ∂w
∂ x −v ∂w∂ y −w ∂w
∂ z )−1ρ
∂ P∂ z −g+u2+v2
re+ ∂w
∂ t conv+∂w
∂ t si . ii . iii . iv . v . vii .vi .
i. local time changeii. advectioniii. pressure gradient forceiv. gravityv. curvature termvi. convective transportvii. eddy transport
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Conservation of Thermal Energy∂T∂ t =(−u ∂T
∂ x −v ∂T∂ y −w ∂T
∂ z )− 1cP
Q
+ 1ρcP
(∂ P∂ t
+u ∂ P∂ x
+v ∂P∂ y
−w ∂ P∂ z )+ ∂T
∂ t conv+ ∂T
∂ t rad+∂T
∂ t s
i . ii . iii .
iv . v . vii .vi .
i. local time changeii. advectioniii. latent heat (condensation/evaporation)iv. compressional warmingv. convective transportvi. radiation (heating/cooling)vii. eddy transport
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Conservation of Mass∂ρ∂ t =(−u ∂ρ
∂ x−v ∂ρ∂ y−w ∂ρ
∂ z )+(−∂ u∂ x−∂v
∂ y−∂w∂ z )
i . ii . iii .
i. local time changeii. advectioniii. divergence
Ideal Gas LawPV=nRtP=ρRT
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R K K I I G Q G
KST daytime
nighttime
elevation anglet
latitudeitude
t ox
solar declinationt celestial longitude
o
N
k
s sUTC
sl b l
b
= ↑ + ↓ + ↓ + ↑ − = −
↓ =>≤
= −
+
=−
=
−
*
sin , sin, sin
sin sin sin cos cos cos
log
tansin sin
.
Ψ ΨΨ
Ψ
00 0
12
1 4090951
2
φ δ φ δπ
λ
φλ
δ
Incoming and Outgoing Long and Short Wave Radiation
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There are eight variables required to start the model:1. East-West Components of the Horizontal Wind2. North-South Components of the Horizontal Wind3. Temperature4. Moisture5. Pressure6. Terrain7. Surface Water Coverage8. Surface Temperature
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Incipient Frontal Cyclone
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47Frontal Fracture
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48Bent Back and T- Bone Phase
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49Warm Core Frontal Seclusion
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Data Analysis
Fourier versus Wavelet
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Computation of Fourier Series Computation of Fourier Series on Interval -on Interval -ππ <= x <= + <= x <= +ππ
f x =ao∑k=1
∞
[ak cos kx bk sin kx ]
a0=1
2∫−a
a
f x dt
ak=1∫−a
a
f x cos k x dt
bk=1∫−a
a
f x sin k x dt
Fourier Coefficients of the Function f(x):
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Computation of Fourier Series Computation of Fourier Series on Interval -on Interval -ππ <= x <= <= x <= ππ
-9.42 -6.28 -3.14 0.00 3.14 6.28 9.42-4
-3
-2
-1
0
1
2
3
4
k=1k=2k=3k=4k=5k=6k=7k=8k=9k=10Sumf(x)=x
S 10 x =∑k=1
10 2−1k1
ksin kx
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Computation of Fourier Series Computation of Fourier Series on Interval -on Interval -aa <= x <= <= x <= aa
Even Function
S 10 x =4
− 2∑k=0
∞ 12k1 2
cos 4k2 x
-6.28 -4.71 -3.14 -1.57 0 1.57 3.14 4.71 6.280
0.2
0.4
0.6
0.8
1
1.2
1.4
1.6
1.8
Sawtooth
k=0k=2k=3k=4k=5k=6k=7k=8k=9k=10
x
f(x)
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Fast Fourier Transform ( FFT)Fast Fourier Transform ( FFT)
Function: y t =e−cos t 2
sin 2t2 cos 4t0.4 sin t sin 50 t
Original Signal discretized with 28=256 points. 0≤t≤2
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Fast Fourier Transform ( FFT)Fast Fourier Transform ( FFT)
Function: y t =e−cos t 2
sin 2t2 cos 4t0.4 sin t sin 50 t
Original Signal discretized with 28=256 points. 0≤t≤2Sun Performance Library FFT used to generate the Discrete Fourier Coefficients yk , k=0,. .. ,255 .Noise has a frequency that is larger than 5 cycles per 2 interval.
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Fast Fourier Transform ( FFT) – Fast Fourier Transform ( FFT) – Use to Filter out Noise.Use to Filter out Noise.
Function: y t =e−cos t 2
sin 2t2 cos 4t0.4 sin t sin 50 t
Original Signal discretized with 28=256 points. 0≤t≤2Sun Performance Library FFT used to generate the Discrete Fourier Coefficients yk , k=0,. .. ,255 .Noise has a frequency that is larger than 5 cycles per 2 interval.Keep only y k for 0≤k≤5 and set yk=0.0 for 6≤k≤128 .By Theorem, yk=0 for 128≤k≤250 . Applying FFT to filter yk
Filtered by keeping first five coefficients and completinginverse FFT.
Error=∣∣y− yc∣∣l2
∣∣y∣∣l2
=0.26
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III. What is a wavelet?
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Haar Wavelet AnalysisHaar Wavelet AnalysisScaling Function: Sometimes called the Father Wavelet.Wavelet : Sometimes called the Mother Wavelet.
-1.5 -1 -0.5 0 0.5 1 1.5 2 2.5-0.2
0
0.2
0.4
0.6
0.8
1
1.2
Haar Scaling Function
x
y
x =1 if 0≤x1 =0 Elsewhere.
Let V 0 be the space of all functions of the form:∑k∈Z
ak x−k ak∈R
Where k can range over any finite set ofpositive and negative integers.
White dots are discontinuities.
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Haar Wavelet AnalysisHaar Wavelet AnalysisScaling Function: Sometimes called the Father Wavelet.Wavelet : Sometimes called the Mother Wavelet.
Haar Scaling Function
x x =1 if 0≤x1 =0 Elsewhere.
x
y
j j1 k k12
x− j
2 2 x−k
1
0 1
2x
12
2
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Haar Wavelet AnalysisHaar Wavelet AnalysisScaling Function: Sometimes called the Father Wavelet.Wavelet : Sometimes called the Mother Wavelet.
White dots are discontinuities.
1
-1
01/2
1 x
x = 2x − 2 x−1/2 = 2 x − 2x−1
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Other Wavelets - ShannonOther Wavelets - Shannon x =
sin x x
-6.28 -3.14 0 3.14 6.28-0.4
-0.2
0
0.2
0.4
0.6
0.8
1
1.2
x
x
x 22 x
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Other Wavelets – Linear SplineOther Wavelets – Linear Spline
x =−x e−x 2
2
x x
x 21 x 22 x 23 x
-3.14 -1.57 0 1.57 3.14-0.8
-0.6
-0.4
-0.2
0
0.2
0.4
0.6
0.8
x
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Other WaveletsOther Wavelets
1)Haar Compact Support Discontinuous
2)Shannon Very Smooth Extend throughout the whole real line Decay at infinity very slowly
3)Linear Spline Continuous Have infinite support Decay rapidly at infinity
Finite or Compact SupportLet V 0 be the space of all functions of the form: ∑
kak x−k ak∈R
where k range over set of positive or negative integers. Since k rangesover a finite set, each element of V 0 is zero outside a bounded set.
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Other Wavelets - DaubechiesOther Wavelets - Daubechies
Enter Ingrid Daubechies:Enter Ingrid Daubechies:●Simplest is Haar wavelet, only discontinuous wavelet.
●Others are continuous and compactly supported.
●As you move up hierarchy, become increasingly smooth ( have prescribed number of continuous derivative).
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Other Wavelets - DaubechiesOther Wavelets - Daubechies
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Other Wavelets - DaubechiesOther Wavelets - DaubechiesDAUB4 Initial Values:
0 ≡0
1≡132
2 ≡1−32
3 ≡0DAUB4
DAUB4 Abreviations:
h0=13
4
h1=33
4
h2=3−3
4
h3=1−3
4
DAUB4 Recurrence Relation: r =h0 2r h1 2r−1 h2 2r−2 h3 2r−3
Say you want to approximate 12+1 points.
Initial Values : r=0,1,2,3
First Iteration: r=12, 32, 52
Second Iteration :r=14, 34, 54, 74, 94, 11
4
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Other Wavelets - DaubechiesOther Wavelets - DaubechiesThe function serves as the basic building block for its associated wavelet,denoted by , and defined by the following recursion:
r ≡−134 2r−1 33
4 2r −3−34 2r11−3
4 2r2
r ≡−h0 2r−1 h1 2r −h2 2r1 h3 2r2
r =−1 1h1−1 2r−1−1 0 h1−0 2r−0 −1 −1h1−[−1] 2r−[−1]−1 −2h1−[−2] 2r−[−2 ]
Because r =0 if r≤0 or r≥3 , it follows that r =0 if 2r2≤0or 2r−1≥3 , or, equivalently, if, r≤−1 or r≥2. For values r such that −1r2 , the recursion yields r .
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Using Wavelets to Filter DataUsing Wavelets to Filter Data
Function: y t =e−cos t 2
sin 2t2 cos 4t0.4 sin t sin 50 t
Original Signal discretized with 28=256 points. 0≤t≤2Numerical Recipes Daub 8 used to generate wavelet coefficients yk , k=0,. .. ,255 .Keep only wavelet coefficients with a magnitude > 1 .
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Fast Fourier Transform ( FFT) – Fast Fourier Transform ( FFT) – Use to Filter out Noise.Use to Filter out Noise.
Function: y t =e−cos t 2
sin 2t2 cos 4t0.4 sin t sin 50 t
Original Signal discretized with 28=256 points. 0≤t≤2Sun Performance Library FFT used to generate the Discrete Fourier Coefficients yk , k=0,. .. ,255 .Noise has a frequency that is larger than 5 cycles per 2 interval.Keep only y k for 0≤k≤5 and set yk=0.0 for 6≤k≤128 .By Theorem, yk=0 for 128≤k≤250 . Applying FFT to filter yk
Filtered by keeping first five coefficients and completinginverse FFT.
Error=∣∣y− yc∣∣l2
∣∣y∣∣l2
=0.26
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IV. Comparison of DWT to FFT
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Comparison of DWT to FFTComparison of DWT to FFTf t =2 sin 2 f 1 t 3sin 2 f 2 t sin 2 f 3 t
f 1=5Hzf 2=20Hzf 3=80 Hz
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Comparison of DWT to FFTComparison of DWT to FFTf t =2sin 2 f 1 t 3 sin 2 f 2 t sin 2 f 3 t
f 1=5Hzf 2=20 Hzf 3=80 Hz
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Comparison of DWT to FFTComparison of DWT to FFTf t =2sin 2 f 1 t 3 sin 2 f 2 t sin 2 f 3 t
f 1=5Hzf 2=20 Hzf 3=80 Hz
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Comparison of DWT to FFTComparison of DWT to FFTf t =2sin 2 f 1 t 3 sin 2 f 2 t
f 1=5Hzf 2=20 Hzf 3=80 Hz
f t =2sin 2 f 1 t sin 2 f 3 t
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Comparison of DWT to FFTComparison of DWT to FFTf t =2sin 2 f 1 t 3 sin 2 f 2 t
f 1=5Hzf 2=20 Hzf 3=80 Hz
f t =2sin 2 f 1 t sin 2 f 3 t
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Comparison of DWT to FFTComparison of DWT to FFTf t =2sin 2 f 1 t 3 sin 2 f 2 t
f 1=5Hzf 2=20 Hzf 3=80 Hz
f t =2sin 2 f 1 t sin 2 f 3 t
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Comparison of DWT to FFTComparison of DWT to FFTf t =2sin 2 f 1 t 3 sin 2 f 2 t
f 1=5Hzf 2=20 Hzf 3=80 Hz
f t =2sin 2 f 1 t sin 2 f 3 t
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Comparison of DWT to FFTComparison of DWT to FFTf t =2sin 2 f 1 t 3 sin 2 f 2 t
f 1=5Hzf 2=20 Hzf 3=80 Hz
f t =2sin 2 f 1 t sin 2 f 3 t
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Comparison of DWT to FFTComparison of DWT to FFTf t =2sin 2 f 1 t 3 sin 2 f 2 t
f 1=5Hzf 2=20 Hzf 3=80 Hz
f t =2sin 2 f 1 t sin 2 f 3 t
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Comparison of DWT to FFTComparison of DWT to FFTf t =2sin 2 f 1 t 3 sin 2 f 2 t
f 1=5Hzf 2=20 Hzf 3=80 Hz
f t =2sin 2 f 1 t sin 2 f 3 t
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Comparison of DWT to FFTComparison of DWT to FFTf t =2sin 2 f 1 t 3 sin 2 f 2 t
f 1=5Hzf 2=20 Hzf 3=80 Hz
f t =2sin 2 f 1 t sin 2 f 3 t
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V. Wavelet Analysis for Temperature Data
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Wavelet Analysis for Temperature Data
Original Signal
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Wavelet Analysis for Temperature Data
Original and Filtered Signal
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Wavelet Analysis for Temperature Data
Filtered Signal
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Wavelet Analysis for Temperature Data
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Wavelet Analysis for Temperature Data
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Wavelet Analysis for Temperature Data
Original Signal
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Wavelet Analysis for Temperature Data
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Wavelet Analysis for Temperature Data
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Wavelet Analysis for Temperature Data
Original Signal
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Conclusions:
1.) The structure of the fronts was found from the data collected.2.) The model reproduced the cyclone well, even though the resolution was too coarse to reproduce the fronts.3.) Wavelet Analysis can be useful to analyze the data.
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What to do Next:
1.) Continue to improve the model, increasing resolution.2.) Analyze the data collected and the model data to see how well the model reproduces the atmosphere.
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103Joseph J. Trout, Ph.D.Joseph J. Trout, Ph.D.Drexel UniversityDrexel [email protected]@drexel.edu610-348-6495610-348-6495
Thank You.Question?