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In computer programming, a pure function is a function that has the following properties:[1][2]
- the function return values are identical for identical arguments (no variation with local static variables, non-local variables, mutable reference arguments or input streams, i.e., referential transparency), and
- the function has no side effects (no mutation of local static variables, non-local variables, mutable reference arguments or input/output streams).
Examples
editPure functions
editThe following examples of C++ functions are pure:
floor
, returning the floor of a number;max
, returning the maximum of two values.- the function f, defined as
The value of
void f() { static std::atomic<unsigned int> x = 0; ++x; }
x
can be only observed inside other invocations off()
, and asf()
does not communicate the value ofx
to its environment, it is indistinguishable from functionvoid f() {}
that does nothing. Note thatx
isstd::atomic
so that modifications from multiple threads executingf()
concurrently do not result in a data race, which has undefined behavior in C and C++.
Impure functions
editThe following C++ functions are impure as they lack the above property 1:
- because of return value variation with a static variable
int f() { static int x = 0; ++x; return x; }
- because of return value variation with a non-local variable
For the same reason, e.g. the C++ library function
int f() { return x; }
sin()
is not pure, since its result depends on the IEEE rounding mode which can be changed at runtime. - because of return value variation with a mutable reference argument
int f(int* x) { return *x; }
- because of return value variation with an input stream
int f() { int x = 0; std::cin >> x; return x; }
The following C++ functions are impure as they lack the above property 2:
- because of mutation of a local static variable
void f() { static int x = 0; ++x; }
- because of mutation of a non-local variable
void f() { ++x; }
- because of mutation of a mutable reference argument
void f(int* x) { ++*x; }
- because of mutation of an output stream
void f() { std::cout << "Hello, world!" << std::endl; }
The following C++ functions are impure as they lack both the above properties 1 and 2:
- because of return value variation with a local static variable and mutation of a local static variable
int f() { static int x = 0; ++x; return x; }
- because of return value variation with an input stream and mutation of an input stream
int f() { int x = 0; std::cin >> x; return x; }
I/O in pure functions
editI/O is inherently impure: input operations undermine referential transparency, and output operations create side effects. Nevertheless, there is a sense in which a function can perform input or output and still be pure, if the sequence of operations on the relevant I/O devices is modeled explicitly as both an argument and a result, and I/O operations are taken to fail when the input sequence does not describe the operations actually taken since the program began execution.[clarification needed]
The second point ensures that the only sequence usable as an argument must change with each I/O action; the first allows different calls to an I/O-performing function to return different results on account of the sequence arguments having changed.[3][4]
The I/O monad is a programming idiom typically used to perform I/O in pure functional languages.
Memoization
editThe outputs of a pure function can be precomputed and cached in a look-up table. In a technique called memoization, any result that is returned from a given function is cached, and the next time the function is called with the same input parameters, the cached result is returned instead of computing the function again.
Memoization can be performed by wrapping the function in another function (wrapper function).[5]
By means of memoization, the computational effort involved in the computations of the function itself can be reduced, at the cost of the overhead for managing the cache and an increase of memory requirements.
A C program for cached computation of factorial (assert()
aborts with an error message if its argument is false; on a 32-bit machine, values beyond fact(12)
cannot be represented anyway.[citation needed]
static int fact(int n) {
return n<=1 ? 1 : fact(n-1)*n;
}
int fact_wrapper(int n) {
static int cache[13];
assert(0<=n && n<13);
if (cache[n] == 0)
cache[n] = fact(n);
return cache[n];
}
Compiler optimizations
editFunctions that have just the above property 2 – that is, have no side effects – allow for compiler optimization techniques such as common subexpression elimination and loop optimization similar to arithmetic operators.[6] A C++ example is the length
method, returning the size of a string, which depends on the memory contents where the string points to, therefore lacking the above property 1. Nevertheless, in a single-threaded environment, the following C++ code
std::string s = "Hello, world!";
int a[10] = {1, 2, 3, 4, 5, 6, 7, 8, 9, 10};
int l = 0;
for (int i = 0; i < 10; ++i) {
l += s.length() + a[i];
}
can be optimized such that the value of s.length()
is computed only once, before the loop.
Some programming languages allow for declaring a pure property to a function:
- In Fortran and D, the
pure
keyword can be used to declare a function to be just side-effect free (i.e. have just the above property 2).[7] The compiler may be able to deduce property 1 on top of the declaration.[8] See also: Fortran 95 language features § Pure procedures. - In the GCC, the
pure
attribute specifies property 2, while theconst
attribute specifies a truly pure function with both properties.[9] - Languages offering compile-time function execution may require functions to be pure, sometimes with the addition of some other constraints. Examples include
constexpr
of C++ (both properties).[10] See also: C++11 § constexpr – Generalized constant expressions.
Unit testing
editSince pure functions have identical return values for identical arguments, they are well suited to unit testing.
See also
edit- Compile-time function execution – The evaluation of pure functions at compile time
- Deterministic algorithm – Algorithm that, given a particular input, will always produce the same output
- Idempotence – Property of operations whereby they can be applied multiple times without changing the result
- Lambda calculus – Mathematical-logic system based on functions
- Purely functional data structure – Data structure implementable in purely functional languages
- Reentrancy (computing) – Executing a function concurrently without interfering with other invocations
References
edit- ^ Bartosz Milewski (2013). "Basics of Haskell". School of Haskell. FP Complete. Archived from the original on 2016-10-27. Retrieved 2018-07-13.
- ^ Brian Lonsdorf (2015). "Professor Frisby's Mostly Adequate Guide to Functional Programming". GitHub. Retrieved 2020-03-20.
- ^ Peyton Jones, Simon L. (2003). Haskell 98 Language and Libraries: The Revised Report (PDF). Cambridge, United Kingdom: Cambridge University Press. p. 95. ISBN 0-521 826144. Retrieved 17 July 2014.
- ^ Hanus, Michael. "Curry: An Integrated Functional Logic Language" (PDF). www-ps.informatik.uni-kiel.de. Institut für Informatik, Christian-Albrechts-Universität zu Kiel. p. 33. Archived from the original (PDF) on 25 July 2014. Retrieved 17 July 2014.
- ^ Aley, R. (2017). Pro Functional PHP Programming: Application Development Strategies for Performance Optimization, Concurrency, Testability, and Code Brevity. SpringerLink : Bücher. Apress. p. 109. ISBN 978-1-4842-2958-3. Retrieved 2024-02-04.
- ^ "Common Function Attributes - Using the GNU Compiler Collection (GCC)". gcc.gnu.org, the GNU Compiler Collection. Free Software Foundation, Inc. Retrieved 2018-06-28.
- ^ Pure attribute in Fortran
- ^ Pure attribute in D language
- ^ "Common Function Attributes". Using the GNU Compiler Collection (GCC. Retrieved 22 July 2021.
- ^ constexpr attribute in C++