A regular function can contain a call to itself in its definition, no problem. I can't figure out how to do it with a lambda function though for the simple reason that the lambda function has no name to refer back to. Is there a way to do it? How?

2I'm tempted to tag this whattheheck or youdontwanttodothis. Why don't you just use a normal function? – phihag Jan 26 '09 at 22:48

3I want to do is to run reduce() on an tree. The lambda works great on a 1D list and recursion felt like a natural way to make it work on a tree. That said, the real reason is that I'm just learning Python, so I'm kicking the tires. – dsimard Jan 26 '09 at 23:12

Reduce works fine with named functions. Guido wanted to remove lambda expressions from the language for a while. They survived, but there's still no reason why you need to use them in any situation. – John Fouhy Jan 26 '09 at 23:34

1please don't use reduce. Reduce with a recursive function is crazy complex. It will take forever. I think it's O(n**3) or something – S.Lott Jan 27 '09 at 0:21

1@S.Lott bummer. Is that a problem with the Python interpreter or something more fundamental that I don't understand yet? – dsimard Jan 27 '09 at 7:42
The only way I can think of to do this amounts to giving the function a name:
fact = lambda x: 1 if x == 0 else x * fact(x1)
or alternately, for earlier versions of python:
fact = lambda x: x == 0 and 1 or x * fact(x1)
Update: using the ideas from the other answers, I was able to wedge the factorial function into a single unnamed lambda:
>>> map(lambda n: (lambda f, *a: f(f, *a))(lambda rec, n: 1 if n == 0 else n*rec(rec, n1), n), range(10))
[1, 1, 2, 6, 24, 120, 720, 5040, 40320, 362880]
So it's possible, but not really recommended!

2
map(lambda n: (lambda f, n: f(f, n))(lambda f, n: n*f(f, n1) if n > 0 else 1, n), range(10))
– jfs Jan 27 '09 at 12:39 
2

1FWIW, here's how to generate numbers in the Fibonacci series with the same technique (assigning it a name):
fibonacci = lambda n: 0 if n == 0 else 1 if n == 1 else fibonacci(n1)+fibonacci(n2)
. – martineau Nov 1 '10 at 19:52 
Another way of genreating Fibonacci numbers using lambdas and recusivity:
f = lambda x: 1 if x in (1,2) else f(x1)+f(x2)
– Juan Gallostra Nov 26 '13 at 14:25 
1Can somebody state why doing a recursive anonymous function call is "not recommended" – ThorSummoner Jun 8 '14 at 8:36
without reduce, map, named lambdas or python internals:
(lambda a:lambda v:a(a,v))(lambda s,x:1 if x==0 else x*s(s,x1))(10)

3

2Since the first function and its return value are called immediately, they're only serving as assignments. Pythonized a bit, this code says
a = lambda myself, x: 1 if x==0 else x * myself(myself, x1)
thenv = 10
and finallya(a, v)
. The complex lambda is designed to accept itself as its first parameter (hence why I've renamed the argument tomyself
), which it uses to call itself recursively – Felipe Sep 11 '15 at 17:07
You can't directly do it, because it has no name. But with a helper function like the Ycombinator Lemmy pointed to, you can create recursion by passing the function as a parameter to itself (as strange as that sounds):
# helper function
def recursive(f, *p, **kw):
return f(f, *p, **kw)
def fib(n):
# The rec parameter will be the lambda function itself
return recursive((lambda rec, n: rec(rec, n1) + rec(rec, n2) if n>1 else 1), n)
# using map since we already started to do black functional programming magic
print map(fib, range(10))
This prints the first ten Fibonacci numbers: [1, 1, 2, 3, 5, 8, 13, 21, 34, 55]
,

I think I finally understand what the Y combinator is for. But I think that in Python it would generally be easier to just use "def" and give the function a name... – pdc Jan 28 '09 at 13:59

Funny thing is, your Fibonacci example is a great example of something more naturally done with a generator. :) – pdc Jan 28 '09 at 13:59


1+1, that's only answer I can understand, excluding these saying it's impossible and the function must have name to call herself. – GingerPlusPlus Oct 26 '14 at 21:59
Contrary to what sth said, you CAN directly do this.
(lambda f: (lambda x: f(lambda v: x(x)(v)))(lambda x: f(lambda v: x(x)(v))))(lambda f: (lambda i: 1 if (i == 0) else i * f(i  1)))(n)
The first part is the fixedpoint combinator Y that facilitates recursion in lambda calculus
Y = (lambda f: (lambda x: f(lambda v: x(x)(v)))(lambda x: f(lambda v: x(x)(v))))
the second part is the factorial function fact defined recursively
fact = (lambda f: (lambda i: 1 if (i == 0) else i * f(i  1)))
Y is applied to fact to form another lambda expression
F = Y(fact)
which is applied to the third part, n, which evaulates to the nth factorial
>>> n = 5
>>> F(n)
120
or equivalently
>>> (lambda f: (lambda x: f(lambda v: x(x)(v)))(lambda x: f(lambda v: x(x)(v))))(lambda f: (lambda i: 1 if (i == 0) else i * f(i  1)))(5)
120
If however you prefer fibs to facts you can do that too using the same combinator
>>> (lambda f: (lambda x: f(lambda v: x(x)(v)))(lambda x: f(lambda v: x(x)(v))))(lambda f: (lambda i: f(i  1) + f(i  2) if i > 1 else 1))(5)
8

6
Yes. I have two ways to do it, and one was already covered. This is my preferred way.
(lambda v: (lambda n: n * __import__('types').FunctionType(
__import__('inspect').stack()[0][0].f_code,
dict(__import__=__import__, dict=dict)
)(n  1) if n > 1 else 1)(v))(5)

4I don't know Python, but that looks terrible. There's really got to be a better way. – Kyle Cronin Jan 27 '09 at 3:41


3

nobody  the point is that this looks horrible for a reason. Python isn't designed for it, and it's bad practice (in Python). Lambdas are limited by design. – Gregg Lind Jan 27 '09 at 22:11

13Yeah, +1 for the worst Python code ever. When Perl people say "You can write maintainable code in Perl if you know what you are doing", I say "Yeah, and you can write unmaintainable code in Python if you know what you are doing". :) – Lennart Regebro Jul 29 '09 at 22:11
I have never used Python, but this is probably what you are looking for.
This answer is pretty basic. It is a little simpler than Hugo Walter's answer:
>>> (lambda f: f(f))(lambda f, i=0: (i < 10)and f(f, i + 1)or i)
10
>>>
Hugo Walter's answer:
(lambda a:lambda v:a(a,v))(lambda s,x:1 if x==0 else x*s(s,x1))(10)
def recursive(def_fun):
def wrapper(*p, **kw):
fi = lambda *p, **kw: def_fun(fi, *p, **kw)
return def_fun(fi, *p, **kw)
return wrapper
factorial = recursive(lambda f, n: 1 if n < 2 else n * f(n  1))
print(factorial(10))
fibonaci = recursive(lambda f, n: f(n  1) + f(n  2) if n > 1 else 1)
print(fibonaci(10))
Hope it would be helpful to someone.
Well, not exactly pure lambda recursion, but it's applicable in places, where you can only use lambdas, e.g. reduce, map and list comprehensions, or other lambdas. The trick is to benefit from list comprehension and Python's name scope. The following example traverses the dictionary by the given chain of keys.
>>> data = {'John': {'age': 33}, 'Kate': {'age': 32}}
>>> [fn(data, ['John', 'age']) for fn in [lambda d, keys: None if d is None or type(d) is not dict or len(keys) < 1 or keys[0] not in d else (d[keys[0]] if len(keys) == 1 else fn(d[keys[0]], keys[1:]))]][0]
33
The lambda reuses its name defined in the list comprehension expression (fn). The example is rather complicated, but it shows the concept.
For this we can use Fixedpoint combinators, specifically Z
combinator, because it will work in strict languages, also called eager languages:
const Z = f => (x => f(v => x(x)(v)))(x => f(v => x(x)(v)))
Define fact
function and modify it:
1. const fact n = n === 0 ? 1 : n * fact(n  1)
2. const fact = n => n === 0 ? 1 : n * fact(n  1)
3. const _fact = (fact => n => n === 0 ? 1 : n * fact(n  1))
Notice that:
fact === Z(_fact)
And use it:
const Z = f => (x => f(v => x(x)(v)))(x => f(v => x(x)(v)));
const _fact = f => n => n === 0 ? 1 : n * f(n  1);
const fact = Z(_fact);
console.log(fact(5)); //120
See also: Fixedpoint combinators in JavaScript: Memoizing recursive functions
If you were truly masochistic, you might be able to do it using C extensions, but to echo Greg (hi Greg!), this exceeds the capability of a lambda (unnamed, anonymous) functon.
No. (for most values of no).

4( > this exceeds the capability of a lambda )  No, it doesn't. The Y combinator is like the most famous abstract construct there is and it does do that without any hacks. – Danny Milosavljevic Jul 3 '12 at 15:34