Elementary definition
Encyclopedia
In mathematical logic
, an elementary definition is a definition that can be made using only finitary
first-order logic
, and in particular without reference to set theory
or using extensions such as plural quantification
.
Elementary definitions are of particular interest because they admit a complete proof apparatus
while still being expressive enough to support most everyday mathematics (via the addition of elementarily-expressible axioms such as ZFC).
Saying that a definition is elementary is a weaker condition than saying it is algebraic
.
Mathematical logic
Mathematical logic is a subfield of mathematics with close connections to foundations of mathematics, theoretical computer science and philosophical logic. The field includes both the mathematical study of logic and the applications of formal logic to other areas of mathematics...
, an elementary definition is a definition that can be made using only finitary
Finitary
In mathematics or logic, a finitary operation is one, like those of arithmetic, that takes a finite number of input values to produce an output. An operation such as taking an integral of a function, in calculus, is defined in such a way as to depend on all the values of the function , and is so...
first-order logic
First-order logic
First-order logic is a formal logical system used in mathematics, philosophy, linguistics, and computer science. It goes by many names, including: first-order predicate calculus, the lower predicate calculus, quantification theory, and predicate logic...
, and in particular without reference to set theory
Set theory
Set theory is the branch of mathematics that studies sets, which are collections of objects. Although any type of object can be collected into a set, set theory is applied most often to objects that are relevant to mathematics...
or using extensions such as plural quantification
Plural quantification
In mathematics and logic, plural quantification is the theory that an individual variable x may take on plural, as well as singular values. As well as substituting individual objects such as Alice, the number 1, the tallest building in London etc...
.
Elementary definitions are of particular interest because they admit a complete proof apparatus
Gödel's completeness theorem
Gödel's completeness theorem is a fundamental theorem in mathematical logic that establishes a correspondence between semantic truth and syntactic provability in first-order logic. It was first proved by Kurt Gödel in 1929....
while still being expressive enough to support most everyday mathematics (via the addition of elementarily-expressible axioms such as ZFC).
Saying that a definition is elementary is a weaker condition than saying it is algebraic
Algebraic definition
In mathematical logic, an algebraic definition is one that can be given using only equations between terms with free variables. Inequalities and quantifiers are specifically disallowed....
.