I know that in Clojure there's syntactic support for "naming" an anonymous function, as other answers have pointed out. However, I want to show a first-principles approach to solve the question, one that does not depend on the existence of special syntax on the programming language and that would work on any language with first-order procedures (lambdas).

In principle, if you want to do a recursive function call, you need to refer to the name of the function so "anonymous" (i.e. *nameless* functions) can not be used for performing a recursion ... unless you use the Y-Combinator. Here's an explanation of how it works in Clojure.

Let me show you how it's used with an example. First, a `Y-Combinator`

that works for functions with a variable number of arguments:

```
(defn Y [f]
((fn [x] (x x))
(fn [x]
(f (fn [& args]
(apply (x x) args))))))
```

Now, the *anonymous* function that implements the `power`

procedure as defined in the question. Clearly, it doesn't have a name, `power`

is only a parameter to the outermost function:

```
(fn [power]
(fn [number exponent]
(if (zero? exponent)
1
(* number (power number (- exponent 1))))))
```

Finally, here's how to apply the `Y-Combinator`

to the anonymous `power`

procedure, passing as parameters `number=5`

and `exponent=3`

(it's not tail-recursive BTW):

```
((Y
(fn [power]
(fn [number exponent]
(if (zero? exponent)
1
(* number (power number (- exponent 1)))))))
5 3)
> 125
```