# Other ternary operators besides ternary conditional (?:)

The "ternary operator" expression is now almost equivalent to the ternary conditional operator:

``````condition ? trueExpression : falseExpression;
``````

However, "ternary operator" literally only means that it takes three arguments. I'm just curious, are there any languages with any other built-in ternary operators besides the conditional operator, and which ones?

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This should probably be CW. –  Konrad Rudolph Jun 8 '10 at 12:01
Then let it be a CW. :) –  Malcolm Jun 11 '10 at 9:16

## 9 Answers

There’s the slice operator in Python:

``````a = [1, 2, 3]
b = a[1 : 2 : 2]
``````

With the operands meaning start, stop and step.

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/me hugs Python –  Oli Jun 8 '10 at 12:03
I've been wondering about this one. Shouldn't we view the range part of the slice operation as being a second-class value? Python throws the error "Invalid range expression" as well as "Invalid slice expression". –  Charles Stewart Jun 9 '10 at 11:56
@Charles: well, there’s not really a formal definition of ternary operator in programming languages, is there? For me, it simply means an atomic part of the language. And while you can extract the `start : stop` syntax from the slice ternary operator to form a binary slice operator, you cannot extract the `: step` portion meaningfully. So for me, the `a : b : c` operator is one operator and the Python documentation also says that. –  Konrad Rudolph Jun 9 '10 at 14:12
Yes, when you look at it that way, it is clearly ternary. –  Charles Stewart Jun 9 '10 at 15:37
This is not really a ternary operator, but a quaternary one. The operator is not only the values inside the brackets, but the brackets as well and the operand before them. Just `a:b:c` doesn't have meaning in Python, but `a[b:c:d]` has (four operands). `a[b:c]` is a ternary operator (a, b and c are the three operands). –  Juliano Jun 17 '10 at 20:08

These operators are often called mixfix operators (also, sometimes triadic operators). The Maude rewriting logic language allows user-defined mixfix operators, as does the dependently typed functional programming language, Agda.

In general, they're not common, because they can be tricky to parse and because, if there is no deferred evaluation, you can usually find a nice, readable decomposition into binary infix operators.

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Python's `a < b < c` comes to mind, it's equivalent to `a < b and b < c` - not to `(a < b) < c` as someone may think.

I suppose we can say in Python there is whole class of ternary comparison operators of the type expr1 op1 expr2 op2 expr3, where op1 and op2 are binary comparison operators?

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SQL's `foo BETWEEN 0 AND 10` is another example.

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Doesn't this just take a high and a low? –  Daniel DiPaolo Jun 9 '10 at 1:32
It also takes a `foo`. –  Michał Marczyk Jun 9 '10 at 1:39

Mathematica has the "TagSet" operator

``````f /: g = h
``````

which associates `g` to `h` and differentiate this assignment using `f`, e.g.

``````a /: f[a] = 2
b /: f[b] = 8
c f[c] + b f[b] + a f[a]
(* # prints 'c f[c] + 8 b + 2 a' *)
``````
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Just to do my bit for Lisp today, many of the binary operators are actually n-ary operators in Common Lisp,

``````(< a b c) => a < b and b < c

(+ 1 2 3) => 6
``````

so you can read `<` as monotonically increasing if it tickles your fancy.

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CLU's element update syntax works on any abstract type that provides a `store` method. The full syntax is "T\$store(primary, e1, e2)", but it has an elegant ternary syntactic sugar:

``````primary[e1] := e2
``````

What I especially like about this is that any type can participate in this syntax; it's not limited to arrays. So you can define it on hash tables, search trees, basically whatever you like.

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Scala's foldLeft (`/:`) operator:

``````val list = List(4, 1, 8, 9)
def add(a: Int, b: Int) = a + b
val sum = (0 /: list)(add)
``````

Takes three parameters: a seed value, a collection and an operation to use for reduction.

It should however be noted that technically Scala doesn't have operators. All the "operators" in Scala are actually just regular methods.

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Operators can be methods: it's a syntactic distinction. But /: is a regular infix operator: (0 :/ List(1,2,3)) evaluates to a third-order function of type "((Int, Int) => Int) => Int". –  Charles Stewart Jun 9 '10 at 12:46
@Charles: Isn't that just an implementation detail? –  missingfaktor Jul 2 '10 at 8:30
@Rahul: Is what an implementation detail? Syntax is normally part of the language spec. –  Charles Stewart Jul 2 '10 at 9:00
@Charles: That `:/` is an infix operator that evaluates to a third-order function of type `((Int, Int) => Int) => Int`. To the user, `/:` looks like something that takes three arguments viz; a seed, an iterable and a reduction operation. –  missingfaktor Jul 2 '10 at 9:20
@Charles: SQL's `BETWEEN-AND` can also be implemented in Scala in a similar manner: paste.pocoo.org/show/232686 Won't you call it a ternary operator? –  missingfaktor Jul 2 '10 at 9:21

A version of the ternary operator "?:" is also present in Scriptic and in Subscript. These are two language extensions, relative to Java and Scala respectively, and based on the Algebra of Communicating Processes (ACP).

ACP is a comparable to boolean algebra, but it does not only come with truth values but also with things that "happen". ACP considers process expressions, built from atomic actions, special constants, refinements, operators and parentheses.

• Addition represents choice. It has a 0-like neutral operand δ, named Deadlock Process.
• Multiplication represents sequence. It has a 1-like neutral operand ε, named Empty Process.

The ternary operator x?y:z in Scriptic and in Subscript means:

do x and then y; in case x ends in deadlock do z

Formally:

Let x, y, v, w be process expressions Let a be an atomic action.

Let failure(x) be a predicate (yielding δ or ε), that tells whether x is effectively equal to δ, and let ! be negation on δ and ε:

``````failure(x+y) = failure(x) · failure(y)
failure(a·x) = δ
failure(ε)   = δ
failure(δ)   = ε
!δ    = ε
!ε    = δ
``````

Then the ternary operator is defined by

``````(x+y)?v:w = !failure(x  )·(x?v:w)
+ !failure(  y)·(y?v:w)
+  failure(x+y)·w

(a·x)?v:w = a·(x?v:w)
δ?v:w = v
ε?v:w = w
``````
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