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# Permutation group: (1234)=(12)(13)(14)

How do I show in sage that

 (1234)=(12)(13)(14)


I tried make use of:

 PermutationGroup([1,2]) * PermutationGroup([1,3])


but it doesn't do what is needed.

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## 1 Answer

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Sage's built-in help is useful here.

sage: PermutationGroup?
Definition:     PermutationGroup(gens=None, gap_group=None, domain=None, canonicalize=True, category=None)
Docstring:
Return the permutation group associated to x (typically a list of
generators).

INPUT:

* "gens" - list of generators (default: "None")

* "gap_group" - a gap permutation group (default: "None")

* "canonicalize" - bool (default: "True"); if "True", sort
generators and remove duplicates

OUTPUT:

* A permutation group.


So indeed you get a permutation group, with these things as generators. You can't multiply groups.

A similar look at help will show you that Permutation does not give an element of a group, though you can convert an element of such a group to one.

But you can get group elements from your group. Try this.

sage: G = SymmetricGroup(4)
sage: G([(1,2)])
(1,2)
sage: G([(1,2)])*G([(1,3)])*G([(1,4)])
(1,2,3,4)

more

## Comments

2

Permutation((1,2)) * Permutation((1,3)) * Permutation((1,4)) == Permutation((1,2,3,4)) should also work.

( 2012-06-12 10:32:44 +0200 )edit
1

Good point, but I don't think they'll be group elements, will they? Well, it's somewhat a semantic issue anyway until one starts using the actual methods of these classes.

( 2012-06-12 10:45:31 +0200 )edit

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Asked: 2012-06-12 09:25:04 +0200

Seen: 525 times

Last updated: Jun 12 '12