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Template:Infobox notation Polish notation, also known as prefix notation, is a form of notation for logic, arithmetic, and algebra. Its distinguishing feature is that it places operators to the left of their operands. If the arity of the operators is fixed, the result is a syntax lacking parentheses or other brackets, that can still be parsed without ambiguity. The Polish logician Jan Łukasiewicz invented this notation around 1920 in order to simplify sentential logic.

Here is a quotation from Nicod's Axiom and Generalizing Deduction, page 180.

I came upon the idea of a parenthesis-free notation in 1924. I used that notation for the first time in my article Łukasiewicz(1), p. 610, footnote.

The reference cited by Jan Łukasiewicz above is apparently a lithographed report in Polish.

While no longer much used in logic, Polish notation has since found a place in computer science.

Arithmetic

The expression for adding the numbers one and two is, in prefix notation, written "+ 1 2" rather than "1 + 2". In more complex expressions, the operators still precede their operands, but the operands may themselves be nontrivial expressions including operators of their own. For instance, the expression that would be written

(5 − 6) * 7

in conventional infix notation can be given as

* (− 5 6) 7

or simply

* - 5 6 7

in prefix.

Since the simple arithmetic operators are all binary (at least, in arithmetic contexts), any prefix representation thereof is unambiguous, and bracketing the prefix expression is unnecessary. In the previous example, the parentheses in the infix version were required, since moving them

5 - (6 * 7)

or simply removing them

5 − 6 * 7

would change the meaning and result of the overall expression. However, the corresponding prefix version of this second calculation would be written

− 5 * 6 7

The processing of the addition is deferred until both operands of the subtraction have been read in. As with any notation, the innermost expressions are evaluated first, but in prefix notation this "innermost-ness" can be conveyed by order rather than bracketing.

Prefix notation of simple arithmetic is largely of academic interest. Unlike the similar postfix reverse Polish notation, prefix notation has been used in few if any commercially-made calculators. However, prefix-notated arithmetic is frequently used as a first, conceptual step in the teaching of compiler construction and of computer programming languages that use prefix notation.

Computer programming

Prefix notation has seen wide application in Lisp s-expressions, where the brackets are required due to the arithmetic operators having variable arity. The postfix reverse Polish notation is used in many stack-based programming languages, and is the operating principle of certain calculators, notably from Hewlett-Packard.

Although obvious, it is important to note that the number of operands in an expression must equal the number of operators plus one, otherwise the statement makes no sense (assuming only binary operators are used in the expression). This can be easy to overlook when dealing with longer, more complicated expressions with several operators, so care must be taken to double check that an expression makes sense when using prefix notation.

Order of operations

Order of operations is defined within the structure of prefix notation and can be easily determined. One thing to keep in mind is that when executing an operation, the operation is applied TO the first operand BY the second operand. This is not an issue with operations that commute, but for non-commutative operations like division or subtraction, this fact is crucial to the analysis of a statement. For example, the following statement:

 / 10 5

is read as "Divide 10 BY 5". Thus the solution is 2, not ½ as would be the result of an incorrect analysis.

Prefix notation is especially popular with stack-based operations due to its innate ability to easily distinguish order of operations without the need for parentheses. To evaluate order of operations under prefix notation, one does not even need to memorize an operational hierarchy, as with infix notation. Instead, one looks directly to the notation to discover which operator to evaluate first. Reading an expression from left to right, one first looks for an operator and proceeds to look for two operands. If another operator is found before two operands are found, then the old operator is placed aside until this new operator is resolved. This process iterates until an operator is resolved, which must happen eventually, as there must be one more operand than there are operators in a complete statement. Once resolved, the operator and the two operands are replaced with a new operand. Because one operator and two operands were removed and one operand was added, there was a net loss of one operator and one operand, meaning that there still exist more operands than operators by a factor of one, allowing the iterative process to complete once again. This is the general theory behind using stacks in programming languages to evaluate a statement in prefix notation, although there are various algorithms that manipulate the process. Once analyzed, a statement in prefix notation becomes less intimidating to the human mind as it allows some separation from convention with added convenience. An example shows the ease with which a complex statement in prefix notation can be deciphered through order of operations:

 - * / 15 - 7 + 1 1 3 + 2 + 1 1 =
 - * / 15 - 7   2   3 + 2 + 1 1 =
 - * / 15     5     3 + 2 + 1 1 =
 - *        3       3 + 2 + 1 1 =
 -          9         + 2 + 1 1 =
 -          9         + 2   2   =
 -          9         4         =
                5

Polish notation for logic

The table below shows the core of Jan Łukasiewicz's notation for sentential logic. The "conventional" notation did not become so until the 1970s and 80s.

Concept	Conventional notation	Polish notation
Negation	$\neg$ φ	Nφ
Conjunction	φ $\wedge$ ψ	Kφψ
Disjunction	φ $\lor$ ψ	Aφψ
Material conditional	φ $\rightarrow$ ψ	Cφψ
Biconditional	φ $\leftrightarrow$ ψ	Eφψ
Sheffer stroke	$\phi \|\psi$	Dφψ
Possibility	$\Diamond$ φ	Mφ
Necessity	$\Box$ φ	Lφ
Universal Quantifier	$\forall$ φ	Πφ
Existential Quantifier	$\exists$ φ	Σφ

Note that the quantifiers ranged over propositional values in Łukasiewicz's work on many-valued logics.

@@ Line 14: / Line 14: @@
 :(5 − 6) * 7
 in conventional infix notation can be given as
-:* (− 5 6) 7
+: * (− 5 6) 7
 or simply
-:* - 5 6 7
+: * - 5 6 7
 in prefix.