Line 11: Line 11:
 
We start with this power series:
 
We start with this power series:
  
<math>A(x) = \sum_{n=0}^{\infty} a(n)x^{n} \ \mid  \ a(n) \in \R \ \ \forall \ n \in \N</math>
+
<math>A(x) = \sum_{n=0}^{\infty} a(n)x^{n} \ \mid  \ a(n) \in \R \ \ \ \forall \ n \in \N</math>
  
 
In case you're not familiar with all the above notation, here's the explicit translation starting starting after the summation term, where each quoted term corresponds to each symbol:  'such that' a(n) 'is an element of' 'the set of real numbers' 'for all' n 'which is an element of' 'the set of natural numbers'.
 
In case you're not familiar with all the above notation, here's the explicit translation starting starting after the summation term, where each quoted term corresponds to each symbol:  'such that' a(n) 'is an element of' 'the set of real numbers' 'for all' n 'which is an element of' 'the set of natural numbers'.
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to arrive at:
 
to arrive at:
  
<math>F(x)=\int_{0}^{\infty} f(t)x^{t} \ dt  \ \mid  \ f(t) \in \R \ \ \forall \ t \in (0,\infty)</math>
+
<math>F(x)=\int_{0}^{\infty} f(t)x^{t} \ dt  \ \mid  \ f(t) \in \R \ \ \ \forall \ t \in (0,\infty)</math>
  
The only difference now is that we sum the contributions of <math>f(t)x^{t}</math> for all ''real numbers'' instead of all ''natural numbers'' from 0 to infiniti, and we can expect <math>f(t)</math> to be defined at all those points.
+
The only difference now is that we sum the contributions of <math>f(t)x^{t}</math> for all ''real numbers'' instead of all ''natural numbers'' from 0 to infiniti, and we can likewise expect <math>f(t)</math> to be defined at all those points.
  
  
 
(3) '''Define variable <math>s</math> in terms of <math>x</math>'''
 
(3) '''Define variable <math>s</math> in terms of <math>x</math>'''
  
<math>F(s)=\int_{0}^{\infty} f(t)e^{-st} \ dt</math>
+
By setting <math>x^{t}</math> to the more easily integrable <math>e^{ln(x)t}</math>, and realizing that <math>e^{ln(x)}</math> only depends on <math>x</math>, we obtain:
 +
 
 +
<math>F(e^{ln(x)}) = F(x)=\int_{0}^{\infty} f(t)e^{ln(x)t} \ dt</math>
 +
 
 +
Finally, noting that the exponential term of the integral only converges if the exponential is to a negative power (which implies that <math>ln(x)</math> must be <math>\leq 0</math>), we arbitrarily set <math>s = -ln(x)</math>, which leaves us with:
 +
 
 +
<math>F(e^{-s}) = F(s)=\int_{0}^{\infty} f(t)e^{-st} \ dt \ | \ \forall s > 0</math>
 +
 
 +
The integral is not necessarily defined if <math>s=0</math>, (eg if <math>f(t)=t</math>).  Also, I'm not sure how to deal with the case when <math>s</math> is undefined (ie <math>x<0</math>), but Prof. Mattuck just asserts that <math>0 < x < 1</math> to avoid this case.

Revision as of 15:52, 2 November 2012

Origin of Laplace Transform (alec green)


In the first 15 minutes of this MIT lecture, Arthur Mattuck delivers a clear illustration of what the Laplace transform really is: a continuous analogy of the discrete power series (specifically, the Maclaurin Series).

Below I've merely summarized his explanation.


(1) Power series = discrete summation

We start with this power series:

$ A(x) = \sum_{n=0}^{\infty} a(n)x^{n} \ \mid \ a(n) \in \R \ \ \ \forall \ n \in \N $

In case you're not familiar with all the above notation, here's the explicit translation starting starting after the summation term, where each quoted term corresponds to each symbol: 'such that' a(n) 'is an element of' 'the set of real numbers' 'for all' n 'which is an element of' 'the set of natural numbers'.

Note that $ a(n) $ is a function here, and just defines the coefficient of each polynomial term in the power series, since a power series is $ = a(0) + a(1)x + a(2)x^{2} + ... + a(n)x^{n} + ... $. However, because the power series is a discrete summation, $ a(n) $ is only guaranteed to be defined if $ n $ is a natural number (non-negative integer), as indicated above. So for example, $ a(23) $ is defined, but not necessarily $ a(-2) $, $ a(.5) $, or $ a(10.001) $.


(2) Integral = continuous summation

Now we'll make the following conversions:

  • from discrete function $ a $ to continuous function $ f $
  • from discrete dependent variable $ n $ to continuous dependent variable $ t $

to arrive at:

$ F(x)=\int_{0}^{\infty} f(t)x^{t} \ dt \ \mid \ f(t) \in \R \ \ \ \forall \ t \in (0,\infty) $

The only difference now is that we sum the contributions of $ f(t)x^{t} $ for all real numbers instead of all natural numbers from 0 to infiniti, and we can likewise expect $ f(t) $ to be defined at all those points.


(3) Define variable $ s $ in terms of $ x $

By setting $ x^{t} $ to the more easily integrable $ e^{ln(x)t} $, and realizing that $ e^{ln(x)} $ only depends on $ x $, we obtain:

$ F(e^{ln(x)}) = F(x)=\int_{0}^{\infty} f(t)e^{ln(x)t} \ dt $

Finally, noting that the exponential term of the integral only converges if the exponential is to a negative power (which implies that $ ln(x) $ must be $ \leq 0 $), we arbitrarily set $ s = -ln(x) $, which leaves us with:

$ F(e^{-s}) = F(s)=\int_{0}^{\infty} f(t)e^{-st} \ dt \ | \ \forall s > 0 $

The integral is not necessarily defined if $ s=0 $, (eg if $ f(t)=t $). Also, I'm not sure how to deal with the case when $ s $ is undefined (ie $ x<0 $), but Prof. Mattuck just asserts that $ 0 < x < 1 $ to avoid this case.

Alumni Liaison

Correspondence Chess Grandmaster and Purdue Alumni

Prof. Dan Fleetwood