irreducibiliteet

Irreducibiliteet (irreducibility) is a fundamental notion describing objects that cannot be decomposed into simpler factors under a given type of factorization. The idea appears in several branches of mathematics, often with related but context-dependent definitions.

In ring theory, an element a of a commutative ring with unity is irreducible if a is

In polynomial rings over a field F, a nonconstant polynomial f is irreducible if it cannot be

In algebraic geometry, an algebraic set V is irreducible if it cannot be written as a union

In topology, a nonempty space X is irreducible if it cannot be expressed as the union of

The concept also extends to modules, schemes, and other structures. The term appears in Finnish as irreduibiliteetti