irreducibilitás

Irreducibilitás refers to the property of a mathematical object, most commonly a polynomial or algebraic expression, that cannot be decomposed into simpler, non-trivial factors within a given algebraic structure. The concept is fundamental in algebra and number theory, particularly in the study of polynomial equations and field extensions.

In the context of polynomials, a polynomial is considered irreducible over a field if it cannot be

The study of irreducibility is closely tied to the Fundamental Theorem of Algebra, which asserts that every

Irreducibility is also relevant in number theory, particularly in the factorization of integers. A prime number

Determining irreducibility often involves advanced techniques, such as Eisenstein’s criterion for polynomials or the use of