Hi,
Let f(x) be an irreducible polynomial over $ZZ[x]$. We can define a number field
K.<a>= NumberField(f(x))
My question is how does one define all the embedding of K into the real or complex in Sage?
You can have a lool at the embeddings method:
sage: K.embeddings?
Then you can gel all embeddings into the (complex) algebraic field QQbar of the real algrbraic field AA.
sage: K.<a>= NumberField(x^2-2)
sage: K
Number Field in a with defining polynomial x^2 - 2
sage: K.embeddings(QQbar)
[
Ring morphism:
From: Number Field in a with defining polynomial x^2 - 2
To: Algebraic Field
Defn: a |--> -1.414213562373095?,
Ring morphism:
From: Number Field in a with defining polynomial x^2 - 2
To: Algebraic Field
Defn: a |--> 1.414213562373095?
]
sage: K.embeddings(AA)
[
Ring morphism:
From: Number Field in a with defining polynomial x^2 - 2
To: Algebraic Real Field
Defn: a |--> -1.414213562373095?,
Ring morphism:
From: Number Field in a with defining polynomial x^2 - 2
To: Algebraic Real Field
Defn: a |--> 1.414213562373095?
]
Or,
sage: K.<a>= NumberField(x^2+1)
sage: K.embeddings(QQbar)
[
Ring morphism:
From: Number Field in a with defining polynomial x^2 + 1
To: Algebraic Field
Defn: a |--> -1*I,
Ring morphism:
From: Number Field in a with defining polynomial x^2 + 1
To: Algebraic Field
Defn: a |--> 1*I
]
sage: K.embeddings(AA)
[]
This is exactly what I want. Thank you very much, Tmonteil!
Asked: 2016-02-10 02:21:24 +0200
Seen: 363 times
Last updated: Feb 10 '16
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