19. the fourier transform in optics - brown university · some functions don’t have fourier...
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19. The Fourier Transform in optics
What is the Fourier Transform?
Anharmonic waves
The spectrum of a light wave
Fourier transform of an exponential
The Dirac delta function
The Fourier transform of ejt, cos(t)
( ) ( ) exp
F f t j t dt 1( ) ( ) exp2
f t F j t d
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There’s no such thing as exp(jt)
0Re j tE t E e
All semester long, we’ve described electromagnetic waves like this:
What’s wrong with this description? Well, what is its behavior after a long time?
lim ???E tt
In the real world, signals never last forever. We must always expect that:
lim 0E tt
This means that no wave can be perfectly “monochromatic”. All waves must be a superposition of different frequencies.
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Jean Baptiste Joseph Fourier, our hero
Later, he was concerned with the physics of heat and developed the Fourier series and transform to model heat-flow problems.
“Fourier’s theorem is not only one of the most beautiful results of modern analysis, but it may be said to furnish an indispensable instrument in the treatment of nearly every recondite question in modern physics.”
Lord Kelvin
Joseph Fourier, 1768 - 1830
Fourier went to Egypt with Napoleon’s army in 1798, and was made Governor of Lower Egypt.
He is also generally credited with the first discussion of the greenhouse effect as a source of planetary warming.
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What do we hope to achieve with theFourier Transform?We desire a measure of the frequencies present in a wave. This willlead to a definition of the term, the “spectrum.”
It will be nice if our measure also tells us when each frequency occurs.
This light wave has many frequencies. And the frequency increases in time (from red to blue).
Monochromatic waves have only one frequency, .
Ligh
t ele
ctric
fiel
d
Time
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The Fourier Transform and its Inverse
Inverse Fourier Transform
Fourier Transform ( ) ( ) exp( )
F f t j t dt
1( ) ( ) exp( )2
f t F j t d
Be aware: there are different definitions of these transforms. The factor of 2π can occur in several places, but the idea is generally the same.
Many of you have seen this in other classes:
We often denote the Fourier transform of a function f(t) by F{ f(t) }, and the inverse transform of a function g() by F-1{ g() }.
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Example: the Fourier Transform of arectangle function: rect(t)
/ 2
/ 2/ 2
/ 2
1( ) exp [exp ]
F j t dt j t
j
( sinc 2 F Imaginary Component = 0
F()
The sinc function crops up everywhere...
f(t) 1
1 [exp 2 exp 2
j jj
exp 2 exp 22
sin 2
j jj
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Example: the Fourier Transform of aGaussian is a Gaussian!
2 2
2
exp exp( )exp( )
exp( / 4 )
F at at j t dt
a
t0
2exp( )at
0
2exp( / 4 )a
There are other examples of functions who are their own Fourier transform.
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The Fourier transform of 1/sqrt(t)
0
1 expF H t j t dtt
Consider the function t 1/2, starting at t = 0:0 if 0
( )1 if 0
tH t
t t
4 je
This is another function which is its own Fourier transform!
This result is significant in the analysis of certain types of random processes - “1/f noise”
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Anharmonic waves are sums of sinusoids.Consider the sum of two sine waves (i.e., harmonic waves) of
different frequencies:
The resulting wave is periodic, but not harmonic.
Essentially all waves are anharmonic. But virtually any anharmonic wave can be written as the sum of harmonic waves.
Fourier analysis is useful because it is the primary tool for handling anharmonic waves.
Sum
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Fourier decomposing functions
Here, we write asquare wave as a sum of sine waves.
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Some functions don’t have Fourier transforms.
( )f t dt
A condition for the existence of a given F() is:
Functions that do not asymptote to zero in both the + and –directions generally do not have Fourier transforms (with some exceptions).
Of course, such functions don’t describe real waves, so this is usually not a problem.
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The spectrum of a light waveWe define the spectrum of a wave E(t) to be the
magnitude of the square of the Fourier transform:
2{ ( )}S F E t
This is our measure of the frequency content of a light wave.
Note that the Fourier transform of E(t) is usually a complex quantity:
By taking the magnitude, we are throwing away the phase information. So the spectrum does not contain all of the information about the wave. It does not contain the spectral phase, which is sometimes important.
jF E t E E e
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time time
The spectrum of a light wave does not contain all of the information about E(t)
These two E-fields E(t) have the same spectrum. But they are obviously different from each other.
The difference is contained in the spectral phase ().
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Measuring the spectrum of a light waveOne reason that the spectrum is such an important quantity is that it is easy to measure.
“spectrometer” - a device which measures the spectrum of a signal
If we divide a light wave into its components, and measure the irradiance at each frequency (or equivalently, at each wavelength), then we have measured the spectrum of the light wave.
So, how do we divide a light wave into its component parts?
prisms disperse light!
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A prism spectrometer
the light source which we wish to study detector to measure
the irradiance of light at each wavelength.
Robert Bunsen, 1859
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More modern spectrometersCzerny spectrometer
a miniaturized spectrometer designed by NASA
This spectrometer is currently on Mars.
10 cm
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The Dirac delta function - a key tool in Fourier analysis
if 0( )
0 if 0
xx
x
x
(x)
The Dirac delta function is not really a function at all, but it is nevertheless very useful.
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The Dirac delta function
It’s best to think of the delta function as a limit of a series of peaked continuous functions.
if 0( )
0 if 0
xx
x
x
height h
width 1/h
Start with this square function, and imagine taking the limit as h
Note that the area under the function remains constant, equal to 1.
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Dirac function Properties
( ) 1
t a dt
( ) ( ) ( )
t a f t dt f a
The area under a function is one:
Integrating any function f(t) multiplied by a function picks out the value of f(t) at the location of the function:
t
(ta)
a
f(t)
f(a)
t
(t)
a
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Fourier Transforms and (t)
1exp( ) 2 (
j t dt And the Fourier Transform of 1 is (t):
t
(t)
()
t
( ) exp( ) exp( [0]) 1
t j t dt j
The Fourier transform of (t) is one.
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The Fourier transform of exp(j0 t)
0 0exp( ) exp( ) exp( )
F j t j t j t dt
0exp( [ ] )
j t dt 02 ( )
exp(j0t)
t
tRe
Im
F {exp(j0t)}
The function exp(j0t) is the essential component of Fourier analysis. It is a pure frequency - its spectrum consists of only one frequency component.
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The Fourier transform of cos(t)
0 0cos( ) cos( ) exp( )
F t t j t dt
0 01 exp( ) exp( ) exp( )2
j t j t j t dt
0 01 1exp( [ ] ) exp( [ ] )2 2
j t dt j t dt
0 0( ) ( )
cos(0t)t
0F{cos( )}t