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Mathlib.NumberTheory.NumberField.Norm

Norm in number fields #

Given a finite extension of number fields, we define the norm morphism as a function between the rings of integers.

Main definitions #

RingOfIntegers.norm K : Algebra.norm as a morphism (𝓞 L) →* (𝓞 K).

Main results #

RingOfIntegers.dvd_norm : if L/K is a finite Galois extension of fields, then, for all (x : 𝓞 L) we have that x ∣ algebraMap (𝓞 K) (𝓞 L) (norm K x).

theorem Algebra.coe_norm_int {K : Type u_1} [Field K] [NumberField K] (x : NumberField.RingOfIntegers K) :

↑((norm ℤ) x) = (norm ℚ) ↑x

theorem Algebra.coe_trace_int {K : Type u_1} [Field K] [NumberField K] (x : NumberField.RingOfIntegers K) :

↑((trace ℤ (NumberField.RingOfIntegers K)) x) = (trace ℚ K) ↑x

noncomputable def RingOfIntegers.norm {L : Type u_1} (K : Type u_2) [Field K] [Field L] [Algebra K L] :

NumberField.RingOfIntegers L →* NumberField.RingOfIntegers K

Algebra.norm as a morphism between the rings of integers.

Equations

Instances For

@[simp]

theorem RingOfIntegers.coe_norm {L : Type u_1} (K : Type u_2) [Field K] [Field L] [Algebra K L] (x : NumberField.RingOfIntegers L) :

↑((norm K) x) = (Algebra.norm K) ↑x

theorem RingOfIntegers.coe_algebraMap_norm {L : Type u_1} (K : Type u_2) [Field K] [Field L] [Algebra K L] (x : NumberField.RingOfIntegers L) :

↑((algebraMap (NumberField.RingOfIntegers K) (NumberField.RingOfIntegers L)) ((norm K) x)) = (algebraMap K L) ((Algebra.norm K) ↑x)

theorem RingOfIntegers.algebraMap_norm_algebraMap {L : Type u_1} (K : Type u_2) [Field K] [Field L] [Algebra K L] (x : NumberField.RingOfIntegers K) :

(algebraMap (NumberField.RingOfIntegers K) K) ((norm K) ((algebraMap (NumberField.RingOfIntegers K) (NumberField.RingOfIntegers L)) x)) = (Algebra.norm K) ((algebraMap K L) ((algebraMap (NumberField.RingOfIntegers K) K) x))

theorem RingOfIntegers.norm_algebraMap {L : Type u_1} (K : Type u_2) [Field K] [Field L] [Algebra K L] (x : NumberField.RingOfIntegers K) :

(norm K) ((algebraMap (NumberField.RingOfIntegers K) (NumberField.RingOfIntegers L)) x) = x ^ Module.finrank K L

theorem RingOfIntegers.isUnit_norm_of_isGalois {L : Type u_1} (K : Type u_2) [Field K] [Field L] [Algebra K L] [FiniteDimensional K L] [IsGalois K L] {x : NumberField.RingOfIntegers L} :

IsUnit ((norm K) x) ↔ IsUnit x

theorem RingOfIntegers.dvd_norm {L : Type u_1} (K : Type u_2) [Field K] [Field L] [Algebra K L] [FiniteDimensional K L] [IsGalois K L] (x : NumberField.RingOfIntegers L) :

x ∣ (algebraMap (NumberField.RingOfIntegers K) (NumberField.RingOfIntegers L)) ((norm K) x)

If L/K is a finite Galois extension of fields, then, for all (x : 𝓞 L) we have that x ∣ algebraMap (𝓞 K) (𝓞 L) (norm K x).

theorem RingOfIntegers.norm_norm {L : Type u_1} (K : Type u_2) [Field K] [Field L] [Algebra K L] (F : Type u_3) [Field F] [Algebra K F] [FiniteDimensional K F] [Algebra F L] [FiniteDimensional F L] [IsScalarTower K F L] (x : NumberField.RingOfIntegers L) :

(norm K) ((norm F) x) = (norm K) x

theorem RingOfIntegers.isUnit_norm (K : Type u_2) [Field K] {F : Type u_3} [Field F] [Algebra K F] [FiniteDimensional K F] [CharZero K] {x : NumberField.RingOfIntegers F} :

IsUnit ((norm K) x) ↔ IsUnit x