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<div class="ChapSects"><a href="chap12.html#X7DD7F0847FF2B96C">12 Applications</a>
<div class="ContSect"> <a href="chap12.html#X8575260A80F735BD">12.1 Free Loop Spaces</a>

<div class="ContSSBlock">
 <a href="chap12.html#X87781C76804E783E">12.1-1 LoopClasses</a>
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<h3>12 Applications</h3>

This chapter was added in April 2018 for version 2.66 of XMod. Initially it describes crossed modules for free loop spaces. Further applications may arise in due course.

<a id="X8575260A80F735BD" name="X8575260A80F735BD"></a>

<h4>12.1 Free Loop Spaces</h4>

These functions have been used to produce examples for Ronald Brown's paper Crossed modules, and the homotopy 2-type of a free loop space [Bro18]. The relevant theorem in that paper is as follows.

Theorem 2.1 Let calM = (∂ : M -> P) be a crossed module of groups and let X = BcalM be the classifying space of calM. Then the components of LX, the free loop space on X, are determined by equivalence classes of elements a ∈ P where a,a' are equivalent if and only if there are elements m ∈ M, p ∈ P such that a'= p + a - ∂ m - p. 

 Further the homotopy 2-type of a component of LX given by a ∈ P is determined by the crossed module of groups LcalM[a] = (∂_a : M -> P(a)) where: 

<ul>
<li> P(a) is the subgroup of the cat^1-group G = P ⋉ M such that ∂ m = [p,a] = -p-a+p+a; 

</li>
<li> ∂_a(m) = (∂ m, m^-1m^a) for m ∈ M; 

</li>
<li> the action of P(a) on M is given by n^(p,m) = n^p for n ∈ M, (p,m) ∈ P(a). 

</li>
</ul>
 In particular π_1(LX,a) is isomorphic to mathrmcokernel(∂_a), and π_2(LX,a) ≅ π_2(X,*)^bara}, the elements of π_2(X,*) fixed under the action of bara, the class of a in π_1(X,*). 

 There is an exact sequence π stackrelϕ-> π -> π_1(LX,a) -> C_bara}(π_1(X,*)) -> 1, in which π = π_2(X,*), and ϕ is the morphism m ↦ m^-1m^a. 

<a id="X87781C76804E783E" name="X87781C76804E783E"></a>

<h5>12.1-1 LoopClasses</h5>

<div class="func"><table class="func" width="100%"><tr><td class="tdleft"><code class="func">‣ LoopClasses</code>( <var class="Arg">M</var> )</td><td class="tdright">( operation )</td></tr></table></div>
<div class="func"><table class="func" width="100%"><tr><td class="tdleft"><code class="func">‣ LoopsXMod</code>( <var class="Arg">M</var>, <var class="Arg">a</var> )</td><td class="tdright">( operation )</td></tr></table></div>
<div class="func"><table class="func" width="100%"><tr><td class="tdleft"><code class="func">‣ AllLoopsXMod</code>( <var class="Arg">M</var> )</td><td class="tdright">( operation )</td></tr></table></div>
The operation <code class="code">LoopClasses</code> computes the equivalence classes [a] described above. These are all unions of conjugacy classes.

The operation <code class="code">LoopsXMod(M,a)</code> calculates the crossed module LcalM[a] described in the theorem.

The operation <code class="code">AllLoopsXMod(M)</code> returns a list of crossed modules, one for each equivalence class of elements [a] ⊆ P.

In the example below the automorphism crossed module <code class="code">X8</code> has M ≅ C_2^3 and P = PSL(3,2) is the automorphism group of M. There are 6 equivalence classes which, in this case, are identical with the conjugacy classes. For each LX calculated, the <code class="func">IdGroup</code> (<a href="chap2.html#X7831DB527CF9DD57">2.8-1</a>) is printed out.

<div class="example"><pre>

gap> SetName( k8, "k8" ); 
gap> Y8 := XModByAutomorphismGroup( k8 );; 
gap> X8 := Image( IsomorphismPerm2DimensionalGroup( Y8 ) );;
gap> SetName( X8, "X8" );
gap> Print( "X8: ", Size( X8 ), " : ", StructureDescription( X8 ), "\n" ); 
X8: [ 8, 168 ] : [ "C2 x C2 x C2", "PSL(3,2)" ]
gap> classes := LoopClasses( X8 );;
gap> List( classes, c -> Length(c) );
[ 1, 21, 56, 42, 24, 24 ]
gap> LX := LoopsXMod( X8, (1,2)(5,6) );;
gap> Size2d( LX ); 
[ 8, 64 ]
gap> IdGroup( LX );
[ [ 8, 5 ], [ 64, 138 ] ]
gap> SetInfoLevel( InfoXMod, 1 );
gap> LX8 := AllLoopsXMod( X8 );;
#I LoopsXMod with a = (), IdGroup = [ [ 8, 5 ], [ 1344, 11686 ] ]
#I LoopsXMod with a = (4,5)(6,7), IdGroup = [ [ 8, 5 ], [ 64, 138 ] ]
#I LoopsXMod with a = (2,3)(4,6,5,7), IdGroup = [ [ 8, 5 ], [ 32, 6 ] ]
#I LoopsXMod with a = (2,4,6)(3,5,7), IdGroup = [ [ 8, 5 ], [ 24, 13 ] ]
#I LoopsXMod with a = (1,2,4,3,6,7,5), IdGroup = [ [ 8, 5 ], [ 56, 11 ] ]
#I LoopsXMod with a = (1,2,4,5,7,3,6), IdGroup = [ [ 8, 5 ], [ 56, 11 ] ]
gap> iso := IsomorphismGroups( Range( LX ), Range( LX8[2] ) );;
gap> iso = fail;
false

</pre></div>

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