In clojure, calling reduce * on en empty collection returns 1. This is quite surprising.

I made this discovery while creating a factorial function, defined as follow :

(defn factorial [n] (reduce * (take-while #(> % 0) (iterate dec n))))

(factorial 0) is correctly returning 1, without me having to write a special case for zero. How come ?

  • 1
    I just finished writing this question and it occured to me that it may be the identity element for the requested operation that is actually being returned (since (reduce + '()) returns 0. Any further explanation appreciated. – Denis May 29 '14 at 15:29
  • The identity of multiplication is 1. mathwords.com/i/identity_of_an_operation.htm – dsm May 29 '14 at 16:48
  • @dsm That's pretty much what I said :) – Denis May 29 '14 at 17:04
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    Yeah, thought I'd link the further explanation you requested. – dsm May 29 '14 at 17:53
  • Wow, just realized I could have replaced the whole (take-while #(> % 0) (iterate dec n)) by (range 1 (inc n)) – Denis May 29 '14 at 21:42
up vote 7 down vote accepted

Checking the code for * and + shows that these two functions implement the 0-arity case by returning the identity for the operation. In the case of * the code is (with dosctring and metadata removed):

(defn *
  ([] 1)
  ([x] (cast Number x))
  ([x y] (. clojure.lang.Numbers (multiply x y)))
  ([x y & more]
     (reduce1 * (* x y) more)))
  • Thank you! It may be obvious, but I’m a Clojure newbie – I've read about runtime polymorphism, but I didn't know how it worked until now. I will use source more often in the future (just found out about it too) :) – Denis May 29 '14 at 15:50
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    The fact that Clojure is an open source language and a great part of it is implemented in Clojure itself is pretty awesome. :) – juan.facorro May 29 '14 at 15:51
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    btw. the reason for (*) yielding 1 is that (Z,*,1) form a Monoid. A couple of nice properties fall out of this fact. One can exploit it when parallelizing reduce. – Joe Lehmann May 29 '14 at 20:13

The main point here is the behaviour of reduce. In

(reduce f s)

... if s is empty, the call returns (f).

Since (*) is 1,

(reduce * ())
; 1

reduce doesn't care that 1 is the identity for *. Though 1 is also the right identity for /,

(reduce / ())
; ArityException Wrong number of args (0) passed to: core$-SLASH- ...

... because, as it happens, / does not declare a 0 arity version.

  • Subtraction is neither associative nor commutative, hence there is no identity element i such that x - i = i - x = x. – dsm May 29 '14 at 18:00
  • @dsm "Let (S, ∗) be a set S with a binary operation ∗ on it. ... an element e of S is called a ... right identity if a ∗ e = a for all a in S" - Wikipedia. So, as I said, 0 is a right identity for -. – Thumbnail May 29 '14 at 18:08
  • The right identity is a very specific subset, not a complete identity. – dsm May 29 '14 at 20:43
  • @dsm To remove any remaining ambiguity, I've removed the parentheses round right in right identity. By the way, the conditions on a right identity are a subset of those for an identity. Right identities themselves are a superset of identities, since every identity is a right identity, but not vice versa. I know what you meant, but it's not exactly what you wrote. – Thumbnail May 30 '14 at 11:42
  • Should have chosen my words more carefully :) – dsm May 30 '14 at 14:37

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