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multiple algebraic extension

asked 2014-01-03 04:24:00 +0200

MvG gravatar image

updated 2015-07-31 18:16:07 +0200

FrédéricC gravatar image

I'm looking for a way to formulate a number field which can express corners of a given regular $n$-gon exactly, but which might be faster than AA. I need to be able to check signs of elements of that number field. Here is what I tried:

n = 17
z = QQbar.zeta(n)
ca = z.real()
sa = z.imag()
QQ[ca, sa]

However I get the error message

ValueError: defining polynomial (x^16 - 17/4*x^14 + 119/16*x^12 -
221/32*x^10 + 935/256*x^8 - 561/512*x^6 + 357/2048*x^4 - 51/4096*x^2 +
17/65536) must be irreducible

How can I avoid this?

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answered 2014-01-03 07:45:58 +0200

tmonteil gravatar image

updated 2014-01-03 07:46:14 +0200

If you want the (smallest) number field containing the corners of the unit regular n-gon, you can do:

sage: F = CyclotomicField(n)

If you want the (smallest) number field containing real and imaginary parts of the first corner of the unit regular n-gon, you can do:

sage: F = number_field_elements_from_algebraics([ca, sa], minimal=True)
sage: F
(Number Field in a with defining polynomial y^16 - 17*y^14 + 119*y^12 - 442*y^10 + 935*y^8 - 1122*y^6 + 714*y^4 - 204*y^2 + 17,
 [1/2*a^14 - 15/2*a^12 + 45*a^10 - 275/2*a^8 + 225*a^6 - 189*a^4 + 70*a^2 - 15/2,
  1/2*a],
 Ring morphism:
  From: Number Field in a with defining polynomial y^16 - 17*y^14 + 119*y^12 - 442*y^10 + 935*y^8 - 1122*y^6 + 714*y^4 - 204*y^2 + 17
  To:   Algebraic Real Field
  Defn: a |--> 0.7224833323743059?)
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Comments

Noting links to [`CyclotomicField`](http://www.sagemath.org/doc/reference/number_fields/sage/rings/number_field/number_field.html#sage.rings.number_field.number_field.CyclotomicField) and [`number_field_elements_from_algebraics`](http://www.sagemath.org/doc/reference/number_fields/sage/rings/qqbar.html?highlight=number_field_elements_from_algebraics#sage.rings.qqbar.number_field_elements_from_algebraics) documentation for reference. Great answer, very helpful! Although `CyclotomicField` looks better at first glance than at second, since it embeds naturally into $\mathbb C$ not $\mathbb R$. Its elements don't support extracting e.g. a real part.

MvG gravatar imageMvG ( 2014-01-03 15:20:55 +0200 )edit

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Asked: 2014-01-03 04:24:00 +0200

Seen: 554 times

Last updated: Jan 03 '14