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.

-
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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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.
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
@Verbeia New image here (with the `?NumericQ` test) i.stack.imgur.com/WfjCu.png –  belisarius Oct 17 '11 at 0:50