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Fundamental theorem of ideal theory in number fields

From Wikipedia, the free encyclopedia

In number theory, the fundamental theorem of ideal theory in number fields states that every nonzero proper ideal in the ring of integers of a number field admits unique factorization into a product of nonzero prime ideals. In other words, every ring of integers of a number field is a Dedekind domain.

References

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  • Keith Conrad, Ideal factorization
  • Hilbert, D. (20 August 1998). The Theory of Algebraic Number Fields. Trans. by Iain T. Adamson. Springer Verlag. ISBN 3-540-62779-0.