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Line 1: {{More citation needed\|date=February 2025}} ~~In [[Fortran]], the number of dimensions in an [[array]].~~ In [[computer programming]], '''rank''' with no further specifications is usually a synonym for (or refers to) "number of dimensions";<ref>{{Cite web \|title=Vocabulary_with_defintions \|url=https://files.schudio.com/federation-of-boldmere-schools/files/documents/Vocabulary_with_defintions.docx}}</ref> thus, a two-dimensional array has rank ''two'', a three-dimensional array has rank ''three'' and so on. ~~For example, a [[matrix (mathematics)\|matrix]] is an array of rank 2.~~ Strictly, no formal definition can be provided which applies to every [[programming language]], since each of them has its own concepts, [[Formal semantics of programming languages\|semantics]] and terminology; the term may not even be applicable or, to the contrary, applied with a very specific meaning in the context of a given language. In the case of [[APL programming language\|APL]] the notion applies to every operand; and [[Binary function\|dyad]]s ("binary functions") have a ''left rank'' and a ''right rank''. ~~A [[scalar]] is sometimes defined as an array of rank 0.~~ The box below instead shows how ''rank of a type'' and ''rank of an array expression'' could be defined (in a semi-formal style) for C++ and illustrates a simple way to calculate them at compile time. {{compu-lang-stub}}▼ <syntaxhighlight lang="cpp"> #include <type_traits> #include <cstddef> /* Rank of a type * ------------- * * Let the rank of a type T be the number of its dimensions if * it is an array; zero otherwise (which is the usual convention) / template <typename T> struct rank { static const std::size_t value = 0; }; template<typename T, std::size_t N> struct rank<T[N]> { static const std::size_t value = 1 + rank<T>::value; }; template <typename T> constexpr auto rank_v = rank<T>::value; / Rank of an expression * * Let the rank of an expression be the rank of its type / template <typename T> using unqualified_t = std::remove_cv_t<std::remove_reference_t<T>>; template <typename T> auto rankof(T&& expr) { return rank_v<unqualified_t<T>>; } </syntaxhighlight> Given the code above the rank of a type T can be calculated at compile time by :<syntaxhighlight lang="cpp">rank<T>::value</syntaxhighlight> or the shorter form :<syntaxhighlight lang="cpp">rank_v<T></syntaxhighlight> Calculating the rank of an expression can be done using :<syntaxhighlight lang="cpp">rankof(expr)</syntaxhighlight> ==See also== [[Rank (linear algebra)]], for a definition of ''rank'' as applied to [[matrix (mathematics)\|matrices]] *[[Rank (J programming language)]], a concept of the same name in the [[J (programming language)\|J programming language]] == References == <references />{{DEFAULTSORT:Rank (Computer Programming)}} [[Category:Arrays]] [[Category:Programming language topics]] ▲{{~~compu~~Compu-lang-stub}}