Algebraic number theory MOC

Minkowski embedding

Let 𝐾 be a number field with signature (𝑟1,𝑟2) with real embeddings {𝜎𝑖}𝑟1𝑖=1 and representative unreal embeddings {𝜏𝑖}𝑟2𝑖=1. The Minkowski embedding alg

𝜄:𝐾↪ℝ𝑟1×ℝ2𝑟2≅ℝ𝑛

is determined by (𝜎𝑚,…,𝜎𝑟1,𝜏1,…,𝜏𝑟2) where we identify ℂ𝑟2 ≅ℝ2𝑟2.

Fundamental property

Let O𝐾 be the ring of integers. Then 𝜄(O𝐾) is a Classical lattice of rank 𝑛, moreover it has covolume alg

covol⁡𝜄(O𝐾)=2−𝑟2√|Δ𝐾:ℚ|

where Δ𝐾:ℚ is the discriminant.¹

Proof

Suppose {𝛼𝑖}𝑛𝑖=1 ⊂O𝐾 is an Integral basis for 𝐾. It suffices to show that {𝜄(𝛼𝑖)}𝑛𝑖=1 form a basis for ℝ𝑛. To this end, let

𝐴1=⎡⎢ ⎢ ⎢ ⎢ ⎢ ⎢ ⎢ ⎢ ⎢ ⎢⎣𝜎1(𝛼1)⋯𝜎1(𝛼𝑛)⋮⋱⋮𝜎𝑟1(𝛼1)⋯𝜎𝑟1(𝛼𝑛)ℜ𝜏1(𝛼1)⋯ℜ𝜏1(𝛼𝑛)ℑ𝜏1(𝛼1)…ℑ𝜏1(𝛼𝑛)⋮⋱⋮ℜ𝜏𝑟2(𝛼1)⋯ℜ𝜏𝑟2(𝛼𝑛)ℑ𝜏𝑟2(𝛼1)⋯ℑ𝜏𝑟2(𝛼𝑛)⎤⎥ ⎥ ⎥ ⎥ ⎥ ⎥ ⎥ ⎥ ⎥ ⎥⎦∈M𝑛,𝑛⁡(ℂ)

be the matrix containing all these embeddings of the 𝛼𝑖. We now apply the following elementary row operations:

1. Add 𝑖ℑ𝜏𝑗(𝛼𝑘) to ℜ𝜏𝑗(𝛼𝑘) giving

𝐴2=⎡⎢ ⎢ ⎢ ⎢ ⎢ ⎢ ⎢ ⎢ ⎢ ⎢⎣𝜎1(𝛼1)⋯𝜎1(𝛼𝑛)⋮⋱⋮𝜎𝑟1(𝛼1)⋯𝜎𝑟1(𝛼𝑛)𝜏1(𝛼1)⋯𝜏1(𝛼𝑛)ℑ𝜏1(𝛼1)…ℑ𝜏1(𝛼𝑛)⋮⋱⋮𝜏𝑟2(𝛼1)⋯𝜏𝑟2(𝛼𝑛)ℑ𝜏𝑟2(𝛼1)⋯ℑ𝜏𝑟2(𝛼𝑛)⎤⎥ ⎥ ⎥ ⎥ ⎥ ⎥ ⎥ ⎥ ⎥ ⎥⎦.

2. Multiply ℑ𝜏𝑗(𝛼𝑘) by −2𝑖 giving

𝐴3=⎡⎢ ⎢ ⎢ ⎢ ⎢ ⎢ ⎢ ⎢ ⎢ ⎢⎣𝜎1(𝛼1)⋯𝜎1(𝛼𝑛)⋮⋱⋮𝜎𝑟1(𝛼1)⋯𝜎𝑟1(𝛼𝑛)𝜏1(𝛼1)⋯𝜏1(𝛼𝑛)−2𝑖ℑ𝜏1(𝛼1)…−2𝑖ℑ𝜏1(𝛼𝑛)⋮⋱⋮𝜏𝑟2(𝛼1)⋯𝜏𝑟2(𝛼𝑛)−2𝑖ℑ𝜏𝑟2(𝛼1)⋯−2𝑖ℑ𝜏𝑟2(𝛼𝑛)⎤⎥ ⎥ ⎥ ⎥ ⎥ ⎥ ⎥ ⎥ ⎥ ⎥⎦.

3. Add 𝜏𝑗(𝛼𝑘) to −2𝑖ℑ𝜏𝑗(𝛼𝑘) giving

𝐴4=⎡⎢ ⎢ ⎢ ⎢ ⎢ ⎢ ⎢ ⎢ ⎢ ⎢⎣𝜎1(𝛼1)⋯𝜎1(𝛼𝑛)⋮⋱⋮𝜎𝑟1(𝛼1)⋯𝜎𝑟1(𝛼𝑛)𝜏1(𝛼1)⋯𝜏1(𝛼𝑛)――𝜏1(𝛼1)⋯――𝜏1(𝛼𝑛)⋮⋱⋮𝜏𝑟2(𝛼1)⋯𝜏𝑟2(𝛼𝑛)―――𝜏𝑟2(𝛼1)⋯―――𝜏𝑟2(𝛼𝑛)⎤⎥ ⎥ ⎥ ⎥ ⎥ ⎥ ⎥ ⎥ ⎥ ⎥⎦.

We see now that 𝐴4 =𝑇(𝛼1,…,𝛼𝑛) as defined in Discriminant of a separable extension, and thus

covol⁡𝜄(OK)=|det𝐴1|=2−𝑟2|det𝑇(𝛼1,…,𝛼𝑛)|=2−𝑟2√|Δ𝐾:ℚ|≠0

as required.

Norm

This generalizes by ^P1 for an ideal 𝔞 ⊴O𝐾 so that

covol⁡𝜄(O𝐾)=2−𝑟2√|Δ𝐾:ℚ|N⁡(𝔞)

whence we define the norm on ℝ𝑟1 ×ℝ2𝑟2 by

N⁡(𝑎1,…,𝑎𝑟1,𝑥1,𝑦1,…,𝑥𝑟2,𝑦𝑟2)=𝑎1⋯𝑎𝑟1(𝑥21+𝑦21)⋯(𝑥2𝑟2+𝑦2𝑟2)

so that

N⁡(𝜄(𝛼))=N𝐾:ℚ⁡(𝛼).

Properties

• Minkowski’s bound

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Footnotes

1. 2022. Algebraic number theory course notes, ¶3.1, p. 58 ↩