Regulator of a number field #
We define and prove basic results about the regulator of a number field K
.
Main definitions and results #
NumberField.Units.regulator
: the regulator of the number fieldK
.Number.Field.Units.regulator_eq_det
: For any infinite placew'
, the regulator is equal to the absolute value of the determinant of the matrix(mult w * log w (fundSystem K i)))_i, w
wherew
runs through the infinite places distinct fromw'
.
Tags #
number field, units, regulator
The regulator of a number fied K
.
Equations
- NumberField.Units.regulator K = Zlattice.covolume (NumberField.Units.unitLattice K) MeasureTheory.volume
Instances For
Let u : Fin (rank K) → (𝓞 K)ˣ
be a family of units and let w₁
and w₂
be two infinite
places. Then, the two square matrices with entries (mult w * log w (u i))_i, {w ≠ w_i}
, i = 1,2
,
have the same determinant in absolute value.
For any infinite place w'
, the regulator is equal to the absolute value of the determinant
of the matrix (mult w * log w (fundSystem K i)))_i, {w ≠ w'}
.