# How to fix syntax to nest functions in mathematica?

I wanted to try to make a rule to do norm squared integrals. For example, instead of the following:

Integrate[ Conjugate[Exp[-\[Beta] Abs[x]]]  Exp[-\[Beta] Abs[x]],
{x, -Infinity, Infinity}]

I tried creating a function to do so, but require the function to take a function:

Clear[complexNorm, g, x]
complexNorm[ g_[ x_ ] ] := Integrate[ Conjugate[g[x]]  * g[x],
{x, -Infinity, Infinity}]
v = complexNorm[ Exp[ - \[Beta] Abs[x]]]  // Trace

Mathematica doesn't have any trouble doing the first integral, but the final result of the trace when my helper function is used, shows just:

complexNorm[E^(-\[Beta] Abs[x])]

with no evaluation of the desired integral?

The syntax closely follows an example I found in http://www.mathprogramming-intro.org/download/MathProgrammingIntro.pdf [page 155], but it doesn't work for me.

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I should have probably added some comments on the applicability of that pattern, on that page. The goal of that example was somewhat different though. Whenever I come up with a new version of the book, will make this part more clear. –  Leonid Shifrin Oct 3 '11 at 10:12

The reason why your expression doesn't evaluate to what you expect is because complexNorm is expecting a pattern of the form f_[x_]. It returned what you put in because it couldn't pattern match what you gave it. If you still want to use your function, you can modify it to the following:

complexNorm[g_] := Integrate[ Conjugate[g] * g, {x, -Infinity, Infinity}]

Notice that you're just matching with anything now. Then, you just call it as complexNorm[expr]. This requires expr to have x in it somewhere though, or you'll get all kinds of funny business.

Also, can't you just use Abs[x]^2 for the norm squared? Abs[x] usually gives you a result of the form Sqrt[Conjugate[x] x].

That way you can just write:

complexNorm[g_] := Integrate[Abs[g]^2, {x, -Infinity, Infinity}]

Since you're doing quantum mechanics, you may find the following some nice syntatic sugar to use:

\[LeftAngleBracket] f_ \[RightAngleBracket] :=
Integrate[Abs[f]^2, {x, -\[Infinity], \[Infinity]}]

That way you can write your expectation values exactly as you would expect them.

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Re: the also. Yes, but I wanted to do the integral of g^* d g next, where d is a second order derivative operator. –  Peeter Joot Oct 3 '11 at 2:55
@PeeterJoot: I added a little something extra to the end of my post again. You might find it interesting. –  Mike Bantegui Oct 3 '11 at 2:59
thanks. That's a nice bit of sugar. –  Peeter Joot Oct 4 '11 at 0:02