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Algebraic integer
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==Finite generation of ring extension== For any {{math|α}}, the [[Subring#Ring_extensions|ring extension]] (in the sense that is equivalent to [[field extension]]) of the integers by {{math|α}}, denoted by <math>\Z[\alpha] \equiv \left\{\sum_{i=0}^n \alpha^i z_i | z_i\in \Z, n\in \Z\right\}</math>, is [[Finitely generated abelian group|finitely generated]] if and only if {{math|α}} is an algebraic integer. The proof is analogous to that of the [[Algebraic_number#Degree_of_simple_extensions_of_the_rationals_as_a_criterion_to_algebraicity|corresponding fact]] regarding [[algebraic number]]s, with <math>\Q</math> there replaced by <math>\Z</math> here, and the notion of [[Degree of a field extension|field extension degree]] replaced by finite generation (using the fact that <math>\Z</math> is finitely generated itself); the only required change is that only non-negative powers of {{math|α}} are involved in the proof. The analogy is possible because both algebraic integers and algebraic numbers are defined as roots of monic polynomials over either <math>\Z</math> or <math>\Q</math>, respectively.
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