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I have a problem with root finding and am having difficulty in getting it to work in this instance.

Some complicated function I need.

f[x_, lambda_, alpha_, beta_, mu_] = 
   Module[{gamma}, 
     gamma = Sqrt[alpha^2 - beta^2]; 
     (gamma^(2*lambda)/((2*alpha)^(lambda - 1/2)*Sqrt[Pi]*Gamma[lambda]))*
      Abs[x - mu]^(lambda - 1/2)*
      BesselK[lambda - 1/2, alpha Abs[x - mu]] E^(beta (x - mu))
   ];

A function I want to find the root of is defined as the integral of this function so I use quadrature:

F[x_, lambda_, alpha_, beta_, mu_] := 
    NIntegrate[f[t, lambda, alpha, beta, mu], {t, 0, x}]; 

Now the problem, mathematica has difficulty solving the roots of this equation,

Q[u_, lambda_, alpha_, beta_, mu_] := 
    x /. FindRoot[F[x, lambda, alpha, beta, mu] == u, {x, 1}]

Does anybody know why? The integral is defined at all points in R. f here is a density function and F its CDF.

Thanks for reading.

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Try using := instead of = in the definition of f.` and see if that helps. –  Verbeia Oct 16 '11 at 4:21
    
I'll post it as an answer, then. –  Verbeia Oct 16 '11 at 6:05
    
@Verbeia if you do, I'll delete mine. Feel free to use my results –  belisarius Oct 16 '11 at 6:11
    
@belisarius ok, done - I've added your graphic to mine. Thanks! –  Verbeia Oct 16 '11 at 6:15
    
@rcollyer We should post an AWK or Perl script for converting questions using greek letters in our Tool Bag question :) –  belisarius Oct 17 '11 at 2:57
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1 Answer 1

up vote 5 down vote accepted

Try using := instead of = in the definition of f and see if that helps.

Incidentally when you use this SetDelayed syntax, you don't need semicolons to suppress output, because it doesn't immediately create output.

Here is some sample output, courtesy of belisarius and WReach:

enter image description here

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3  
You can eliminate the "not a valid limit" warning message by redefining F: Clear@F; F[x_?NumericQ, ...] := ... –  WReach Oct 16 '11 at 15:28
    
@WReach The fault was mine and not Verbeia's. I was too lazy to correct a non-critical bug. (My original answer is now deleted because the main idea was posted by Verbeia in a comment and then mutated into this answer) –  belisarius Oct 17 '11 at 0:36
    
@Verbeia New image here (with the ?NumericQ test) i.stack.imgur.com/WfjCu.png –  belisarius Oct 17 '11 at 0:50
    
belisarius - I'm at work, between meetings - feel free to edit my answer –  Verbeia Oct 17 '11 at 3:16
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