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=[[Week_5|Week 5 HW]], Chapter 6, Problem 35, [[MA453]], Spring 2008, [[user:walther|Prof. Walther]]=
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==Problem Statement==
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''Could somebody please state the problem?''
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==Discussion==
  
 
Let ''a'' belong to a group ''G'' and let |''a''| be finite.  Let <math>\phi_a</math> be the automorphism of ''G'' given by <math>\phi_a (x) = axa^{-1}</math>.  Show that |<math>\phi_a</math>| divides |''a''|.  Exhibit an element ''a'' from a group for which 1<|<math>\phi_a</math>|<|''a''|.
 
Let ''a'' belong to a group ''G'' and let |''a''| be finite.  Let <math>\phi_a</math> be the automorphism of ''G'' given by <math>\phi_a (x) = axa^{-1}</math>.  Show that |<math>\phi_a</math>| divides |''a''|.  Exhibit an element ''a'' from a group for which 1<|<math>\phi_a</math>|<|''a''|.
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By the properties of isomorphisms, we know that <math>\scriptstyle\phi_\alpha\phi_\beta\ =\ \phi_{\alpha\beta}</math>. Inductively then we know that <math>\scriptstyle(\phi_\alpha)^k\ =\ \phi_{\alpha^k}</math>. Let <math>\scriptstyle\mid a\mid\ =\ n</math>. Then <math>\scriptstyle a^n\ =\ e</math>, and <math>\scriptstyle\phi_{a^n}\ =\ \phi_e</math>. So, <math>\scriptstyle(\phi_a)^n\ =\ \phi_{a^n}\ =\ \phi_e</math>, and <math>\scriptstyle\mid\phi_a\mid\ \textstyle\mid\scriptstyle\ n</math>.
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:--[[User:Narupley|Nick Rupley]] 12:15, 11 February 2009 (UTC)
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Let <math>|a|=n</math>. Then <math>\phi_a^n(x)=a^nxa^{-n}=x</math>. Does this mean that <math>|\phi_a|=n</math> as well? Can someone explain what the order of an isomorphism is?
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The order of the morphism is the number of iterations of the morphism it takes to return back to the original value. So in this problem, the order is n, because when a^n = a^(-n) = e, you get x back.
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--K. Brumbaugh
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[[Question about second part?]]
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{{:Question about second part?}}
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[[Week_5|Back to Week 5 Homework]]
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[[MA453_(WaltherSpring2009)|Back to MA453 Spring 2009 Prof. Walther]]
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[[Category:MA453Spring2009Walther]]

Latest revision as of 16:23, 22 October 2010

Week 5 HW, Chapter 6, Problem 35, MA453, Spring 2008, Prof. Walther

Problem Statement

Could somebody please state the problem?


Discussion

Let a belong to a group G and let |a| be finite. Let $ \phi_a $ be the automorphism of G given by $ \phi_a (x) = axa^{-1} $. Show that |$ \phi_a $| divides |a|. Exhibit an element a from a group for which 1<|$ \phi_a $|<|a|.


By the properties of isomorphisms, we know that $ \scriptstyle\phi_\alpha\phi_\beta\ =\ \phi_{\alpha\beta} $. Inductively then we know that $ \scriptstyle(\phi_\alpha)^k\ =\ \phi_{\alpha^k} $. Let $ \scriptstyle\mid a\mid\ =\ n $. Then $ \scriptstyle a^n\ =\ e $, and $ \scriptstyle\phi_{a^n}\ =\ \phi_e $. So, $ \scriptstyle(\phi_a)^n\ =\ \phi_{a^n}\ =\ \phi_e $, and $ \scriptstyle\mid\phi_a\mid\ \textstyle\mid\scriptstyle\ n $.

--Nick Rupley 12:15, 11 February 2009 (UTC)

Let $ |a|=n $. Then $ \phi_a^n(x)=a^nxa^{-n}=x $. Does this mean that $ |\phi_a|=n $ as well? Can someone explain what the order of an isomorphism is?



The order of the morphism is the number of iterations of the morphism it takes to return back to the original value. So in this problem, the order is n, because when a^n = a^(-n) = e, you get x back.

--K. Brumbaugh


Question about second part?

For the part where we have to exhibit an element that has the property, how do you know what to start with? I wasn't clear about it. Just wondering.

--Jrendall 17:33, 14 February 2009 (UTC) --Jrendall 00:33, 19 February 2009 (UTC)


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