associative adj

1 relating to or resulting from association; "associative recall"

2 characterized by or causing or resulting from association; "associative learning" [syn: associatory] [ant: nonassociative]

English

Adjective

associative

1. (of an operator * ) such that, for any operands a, b, c , (a * b) * c = a * (b * c)
2. Addressable by a key more complex than an integer index.

   Awk's associative arrays may be indexed by strings.

   Associative memories were once given considerable attention.

Translations

• ttbc Arabic: تجميعية
• ttbc Catalan: associatiu , associativa
• ttbc French: associatif , associative
• ttbc Spanish: asociativo , asociativa

French

Pronunciation

• lang=fr|/a.sɔ.sja.tiv/
• SAMPA: /a.sO.sja.tiv/

associative

• associative

Italian

Adjective

associative

1. Feminine plural form of associativo

This article is about associativity in mathematics. For associativity in central processor unit memory cache architecture see CPU cache. For associativity in programming languages see operator associativity.

In mathematics, associativity is a property that a binary operation can have. It means that, within an expression containing two or more of the same associative operators in a row, the order of operations does not matter as long as the sequence of the operands is not changed. That is, rearranging the parentheses in such an expression will not change its value. Consider for instance the equation

(5+2)+1=5+(2+1)=8

Even though the parentheses were rearranged, the value of the expression was not altered. Since this holds true when performing addition on any real numbers, we say that "addition of real numbers is an associative operation."

Associativity is not to be confused with commutativity. Commutativity justifies changing the order or sequence of the operands within an expression while associativity does not. For example,

(5+2)+1=5+(2+1)

is an example of associativity because the parentheses were changed (and consequently the order of operations during evaluation) while the operands 5, 2, and 1 appeared in the exact same order from left to right in the expression.

(5+2)+1=(2+5)+1

is not an example of associativity because the operand sequence changed when the 2 and 5 switched places.

Associative operations are abundant in mathematics, and in fact most algebraic structures explicitly require their binary operations to be associative. However, many important and interesting operations are non-associative; one common example would be the vector cross product.

Definition

Formally, a binary operation *\!\!\! on a set S is called associative if it satisfies the associative law:

(x*y)*z=x*(y*z)\qquad\mboxx,y,z\in S.

The evaluation order does not affect the value of such expressions, and it can be shown that the same holds for expressions containing any number of *\!\!\! operations. Thus, when *\!\!\! is associative, the evaluation order can therefore be left unspecified without causing ambiguity, by omitting the parentheses and writing simply:

x*y*z.\,

However, it is important to remember that changing the order of operations does not involve or permit changing the actual operations themselves by moving the operands around within the expression.

Examples

Some examples of associative operations include the following.

• In arithmetic, addition and multiplication of real numbers are associative; i.e.,

\left. \begin (x+y)+z=x+(y+z)=x+y+z\quad \\ (x\,y)z=x(y\,z)=x\,y\,z\qquad\qquad\qquad\quad\ \ \, \end \right\} \mboxx,y,z\in\mathbb.

• Addition and multiplication of complex numbers and quaternions is associative. Addition of octonions is also associative, but multiplication of octonions is non-associative.

• The greatest common divisor and least common multiple functions act associatively.

\left. \begin \operatorname(\operatorname(x,y),z)= \operatorname(x,\operatorname(y,z))= \operatorname(x,y,z)\ \quad \\ \operatorname(\operatorname(x,y),z)= \operatorname(x,\operatorname(y,z))= \operatorname(x,y,z)\quad \end \right\}\mboxx,y,z\in\mathbb.

• Because linear transformations are functions that can be represented by matrices with matrix multiplication being the representation of functional composition, one can immediately conclude that matrix multiplication is associative.

• Taking the intersection or the union of sets:

\left. \begin (A\cap B)\cap C=A\cap(B\cap C)=A\cap B\cap C\quad \\ (A\cup B)\cup C=A\cup(B\cup C)=A\cup B\cup C\quad \end \right\}\mboxA,B,C.

• If M is some set and S denotes the set of all functions from M to M, then the operation of functional composition on S is associative:

(f\circ g)\circ h=f\circ(g\circ h)=f\circ g\circ h\qquad\mboxf,g,h\in S.

• Slightly more generally, given four sets M, N, P and Q, with h: M to N, g: N to P, and f: P to Q, then

(f\circ g)\circ h=f\circ(g\circ h)=f\circ g\circ h

as before. In short, composition of maps is always associative.

• Consider a set with three elements, A, B, and C. The following operation:

is associative. Thus, for example, A(BC)=(AB)C. This mapping is not commutative.

Non-associativity

A binary operation * on a set S that does not satisfy the associative law is called non-associative. Symbolically,

(x*y)*z\ne x*(y*z)\qquad\mboxx,y,z\in S.

For such an operation the order of evaluation does matter. Subtraction, division and exponentiation are well-known examples of non-associative operations:

\begin (5-3)-2\ne 5-(3-2)\quad \\ (4/2)/2\ne 4/(2/2)\qquad\qquad \\ 2^\ne (2^1)^2.\quad\qquad\qquad \end

In general, parentheses must be used to indicate the order of evaluation if a non-associative operation appears more than once in an expression. However, mathematicians agree on a particular order of evaluation for several common non-associative operations. This is simply a syntactical convention to avoid parentheses.

A left-associative operation is a non-associative operation that is conventionally evaluated from left to right, i.e.,

\left. \begin x*y*z=(x*y)*z\qquad\qquad\quad\, \\ w*x*y*z=((w*x)*y)*z\quad \\ \mbox\qquad\qquad\qquad\qquad\qquad\qquad\ \ \, \end \right\} \mboxw,x,y,z\in S

while a right-associative operation is conventionally evaluated from right to left:

\left. \begin x*y*z=x*(y*z)\qquad\qquad\quad\, \\ w*x*y*z=w*(x*(y*z))\quad \\ \mbox\qquad\qquad\qquad\qquad\qquad\qquad\ \ \, \end \right\} \mboxw,x,y,z\in S

Both left-associative and right-associative operations occur; examples are given below.

More examples

Left-associative operations include the following.

• Subtraction and division of real numbers:

x-y-z=(x-y)-z\qquad\mboxx,y,z\in\mathbb;

x/y/z=(x/y)/z\qquad\qquad\quad\mboxx,y,z\in\mathbb\mboxy\ne0,z\ne0.

Right-associative operations include the following.

• Exponentiation of real numbers:

x^=x^.\,

The reason exponentiation is right-associative is that a repeated left-associative exponentiation operation would be less useful. Multiple appearances could (and would) be rewritten with multiplication:

(x^y)^z=x^.\,

Non-associative operations for which no conventional evaluation order is defined include the following.

• Taking the pairwise average of real numbers:

\ne\ne\qquad\mboxx,y,z\in\mathbb.

• Taking the relative complement of sets:

(A\backslash B)\backslash C\ne A\backslash (B\backslash C)\qquad\mboxA,B,C.

The green part in the left Venn diagram represents (A\B)\C. The green part in the right Venn diagram represents A\(B\C).

• Using right-associative notation for material conditional can be motivated e.g. by Curry-Howard correspondence: see e.g. comparison of the first two axioms of the Hilbert-style deduction system with basic combinators of combinatory logic.

See also

• A semigroup is a set with a closed associative binary operation.
• Commutativity and distributivity are two other frequently discussed properties of binary operations.
• Power associativity and alternativity are weak forms of associativity.