Can a lambda function call itself recursively in Python?
Question:
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?
Answers:
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(x-1)
or alternately, for earlier versions of python:
fact = lambda x: x == 0 and 1 or x * fact(x-1)
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, n-1), n), range(10))
[1, 1, 2, 6, 24, 120, 720, 5040, 40320, 362880]
So it’s possible, but not really recommended!
You can’t directly do it, because it has no name. But with a helper function like the Y-combinator 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, n-1) + rec(rec, n-2) 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],
If you were truly masochistic, you might be able to do it using C extensions, but this exceeds the capability of a lambda (unnamed, anonymous) functon.
No. (for most values of no).
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)
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,x-1))(10)
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 fixed-point 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
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.
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,x-1))(10)
Short answer
Z = lambda f : (lambda x : f(lambda v : x(x)(v)))(lambda x : f(lambda v : x(x)(v)))
fact = Z(lambda f : lambda n : 1 if n == 0 else n * f(n - 1))
print(fact(5))
Edited: 04/24/2022
Explanation
For this we can use Fixed-point 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:
Fixed-point combinators in JavaScript: Memoizing recursive functions
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.
Lambda can easily replace recursive functions in Python:
For example, this basic compound_interest:
def interest(amount, rate, period):
if period == 0:
return amount
else:
return interest(amount * rate, rate, period - 1)
can be replaced by:
lambda_interest = lambda a,r,p: a if p == 0 else lambda_interest(a * r, r, p - 1)
or for more visibility :
lambda_interest = lambda amount, rate, period:
amount if period == 0 else
lambda_interest(amount * rate, rate, period - 1)
USAGE:
print(interest(10000, 1.1, 3))
print(lambda_interest(10000, 1.1, 3))
Output:
13310.0
13310.0
By the way, instead of slow calculation of Fibonacci:
f = lambda x: 1 if x in (1,2) else f(x-1)+f(x-2)
I suggest fast calculation of Fibonacci:
fib = lambda n, pp=1, pn=1, c=1: pp if c > n else fib(n, pn, pn+pp, c+1)
It works really fast.
Also here is factorial calculation:
fact = lambda n, p=1, c=1: p if c > n else fact(n, p*c, c+1)
I know this is an old thread, but it ranks high on some google search results :). With the arrival of python 3.8 you can use the walrus operator to implement a Y-combinator with less syntax!
fib = (lambda f: (rec := lambda args: f(rec, args)))
(lambda f, n: n if n <= 1 else f(n-2) + f(n-1))
As simple as:
fac = lambda n: 1 if n <= 1 else n*fac(n-1)
We can now use new python syntax to make it way shorter and easier to read:
Fibonacci:
>>> (f:=lambda x: 1 if x <= 1 else f(x - 1) + f(x - 2))(5)
8
Factorial:
>>> (f:=lambda x: 1 if x == 0 else x*f(x - 1))(5)
120
We use := to name the lambda: use the name directly in the lambda itself and call it right away as an anonymous function.
I got some homework about it and figured out something, heres an example of a lambda function with recursive calls:
sucesor = lambda n,f,x: (f)(x) if n == 0 else sucesor(n-1,f,(f)(x))
I liked motokur’s answer as its succint. Here’s my thinking about finding the solution :
For recursion, we need to call the same method but since its a lambda, we can’t get a ref to it. One way we can reference a name is via method parameters. So, the method we want to call should be passed as a parameter. ( Another way is to get a ref to the current method by inspecting the call stack as in habnabit’s answer)
The next thing is to be able to pass different values to each recursive call. So we introduce another parameter to hold the value.
A example calculating the factorial of 6 :
(lambda f : f(f,6) )( lambda f, x : 1 if x <= 1 else x * f(f, x-1) )
OR
Defining the param from the start instead of hard-coding it :
(lambda f,x : f(f,x) )( (lambda f, x : 1 if x <= 1 else x * f(f, x-1)), 6)
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?
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(x-1)
or alternately, for earlier versions of python:
fact = lambda x: x == 0 and 1 or x * fact(x-1)
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, n-1), n), range(10))
[1, 1, 2, 6, 24, 120, 720, 5040, 40320, 362880]
So it’s possible, but not really recommended!
You can’t directly do it, because it has no name. But with a helper function like the Y-combinator 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, n-1) + rec(rec, n-2) 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],
If you were truly masochistic, you might be able to do it using C extensions, but this exceeds the capability of a lambda (unnamed, anonymous) functon.
No. (for most values of no).
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)
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,x-1))(10)
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 fixed-point 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
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.
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,x-1))(10)
Short answer
Z = lambda f : (lambda x : f(lambda v : x(x)(v)))(lambda x : f(lambda v : x(x)(v)))
fact = Z(lambda f : lambda n : 1 if n == 0 else n * f(n - 1))
print(fact(5))
Edited: 04/24/2022
Explanation
For this we can use Fixed-point 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:
Fixed-point combinators in JavaScript: Memoizing recursive functions
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.
Lambda can easily replace recursive functions in Python:
For example, this basic compound_interest:
def interest(amount, rate, period):
if period == 0:
return amount
else:
return interest(amount * rate, rate, period - 1)
can be replaced by:
lambda_interest = lambda a,r,p: a if p == 0 else lambda_interest(a * r, r, p - 1)
or for more visibility :
lambda_interest = lambda amount, rate, period:
amount if period == 0 else
lambda_interest(amount * rate, rate, period - 1)
USAGE:
print(interest(10000, 1.1, 3))
print(lambda_interest(10000, 1.1, 3))
Output:
13310.0
13310.0
By the way, instead of slow calculation of Fibonacci:
f = lambda x: 1 if x in (1,2) else f(x-1)+f(x-2)
I suggest fast calculation of Fibonacci:
fib = lambda n, pp=1, pn=1, c=1: pp if c > n else fib(n, pn, pn+pp, c+1)
It works really fast.
Also here is factorial calculation:
fact = lambda n, p=1, c=1: p if c > n else fact(n, p*c, c+1)
I know this is an old thread, but it ranks high on some google search results :). With the arrival of python 3.8 you can use the walrus operator to implement a Y-combinator with less syntax!
fib = (lambda f: (rec := lambda args: f(rec, args)))
(lambda f, n: n if n <= 1 else f(n-2) + f(n-1))
As simple as:
fac = lambda n: 1 if n <= 1 else n*fac(n-1)
We can now use new python syntax to make it way shorter and easier to read:
Fibonacci:
>>> (f:=lambda x: 1 if x <= 1 else f(x - 1) + f(x - 2))(5)
8
Factorial:
>>> (f:=lambda x: 1 if x == 0 else x*f(x - 1))(5)
120
We use := to name the lambda: use the name directly in the lambda itself and call it right away as an anonymous function.
I got some homework about it and figured out something, heres an example of a lambda function with recursive calls:
sucesor = lambda n,f,x: (f)(x) if n == 0 else sucesor(n-1,f,(f)(x))
I liked motokur’s answer as its succint. Here’s my thinking about finding the solution :
For recursion, we need to call the same method but since its a lambda, we can’t get a ref to it. One way we can reference a name is via method parameters. So, the method we want to call should be passed as a parameter. ( Another way is to get a ref to the current method by inspecting the call stack as in habnabit’s answer)
The next thing is to be able to pass different values to each recursive call. So we introduce another parameter to hold the value.
A example calculating the factorial of 6 :
(lambda f : f(f,6) )( lambda f, x : 1 if x <= 1 else x * f(f, x-1) )
OR
Defining the param from the start instead of hard-coding it :
(lambda f,x : f(f,x) )( (lambda f, x : 1 if x <= 1 else x * f(f, x-1)), 6)