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I'd like to generate binary numbers of n digits from 0 to 2^n-1. For example of 3 digits, "000", "001", "010", ..., "111" (0 to 7 in decimal). The way I used is to use java.lang.Integer.toBinaryString() method and add zeros if necessary like the following:

(defn pad-zero [s n]
  (str (reduce str (repeat (- n (count s)) "0")) s))

(defn binary-permutation [n]
  (map (fn [s] (pad-zero s n))
       (map #(Integer/toBinaryString %) (range 0 (Math/pow 2 n)))))

With this code, I can generate what I want like this. For 3 digits:

(binary-permutation 3)
=> ("000" "001" "010" "011" "100" "101" "110" "111")

But this codes look a little verbose. Aren't there any ways better or more clojure way to do this?

share|improve this question
up vote 6 down vote accepted

You can simplify the formatting using cl-format from clojure.pprint:

(defn binary-permutation [n]
  (map (partial cl-format nil "~v,'0B" n) (range 0 (Math/pow 2 n))))

You may also be interested to know that (Math/pow 2 n) is equivalent to (bit-shift-left 1 n).

Another way to express this would be in term of selections from clojure.math.combinatorics:

(defn binary-permutation [n]
  (map (partial apply str) (selections [0 1] n)))
share|improve this answer
Why use cl-format? – noahlz Aug 22 '12 at 18:56
@noahz cl-format is an output formatting function from Common Lisp that is available in Clojure (akin to printf in other languages). It just makes it a bit easier to output padded binary numbers as the OP was doing. Saving a keystrokes. If you have an alternative feel free to post it as well. – Alexandre Jasmin Aug 22 '12 at 21:17
@noahz And if you're asking why use one version of this function over the other. I'm not sure. I'd say the range based version is a bit simpler to grok. It's just counting. But combinatorics solution is interesting as well. – Alexandre Jasmin Aug 22 '12 at 21:33
@AlexandreJasmin The first one using cl-format is exactly what I tried to do. However, what I really wanted to get was not binary string like "011" but was [0 1 1], and using selections would best fit what I wanted. Not necessarily map the result of selections. Thank you. – ntalbs Aug 23 '12 at 8:46
(defn binary-permutation [n]
  (for [x (range (Math/pow 2 n))]
    (apply str (reverse (take n (map #(bit-and 1 %) (iterate #(bit-shift-right % 1) x)))))))

(defn pad-zero [s n]
  (apply str (take-last n (concat (repeat n \0) s))))
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