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newCW.xml
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newCW.xml
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<Chapter><Heading>Regular CW-Complexes</Heading> <Section><Heading> </Heading>
<ManSection> <Func Name="SimplicialComplexToRegularCWComplex" Arg="K"/> <Description> <P/> Inputs a simplicial complex <M>K</M> and returns the corresponding regular CW-complex. <P/><B>Examples:</B> <URL><Link>../www/SideLinks/About/aboutMetrics.html</Link><LinkText>1</LinkText></URL> , <URL><Link>../www/SideLinks/About/aboutRandomComplexes.html</Link><LinkText>2</LinkText></URL>
</Description> </ManSection>
<ManSection> <Func Name="CubicalComplexToRegularCWComplex" Arg="K"/> <Func Name="CubicalComplexToRegularCWComplex" Arg="K,n"/> <Description> <P/> Inputs a pure cubical complex (or cubical complex) <M>K</M> and returns the corresponding regular CW-complex. If a positive integer <M>n</M> is entered as an optional second argument, then just the <M>n</M>-skeleton of <M>K</M> is returned. <P/><B>Examples:</B> <URL><Link>../www/SideLinks/About/aboutKnots.html</Link><LinkText>1</LinkText></URL>
</Description> </ManSection>
<ManSection> <Func Name="CriticalCellsOfRegularCWComplex" Arg="Y"/> <Func Name="CriticalCellsOfRegularCWComplex" Arg="Y,n"/> <Description> <P/> Inputs a regular CW-complex <M>Y</M> and returns the critical cells of <M>Y</M> with respect to some discrete vector field. If <M>Y</M> does not initially have a discrete vector field then one is constructed. <P/> If a positive integer <M>n</M> is given as a second optional input, then just the critical cells in dimensions up to and including <M>n</M> are returned. <P/> The function <M>CriticalCellsOfRegularCWComplex(Y)</M> works by homotopy reducing cells starting at the top dimension. The function <M>CriticalCellsOfRegularCWComplex(Y,n)</M> works by homotopy coreducing cells starting at dimension 0. The two methods may well return different numbers of cells. <P/><B>Examples:</B> <URL><Link>../www/SideLinks/About/aboutPeripheral.html</Link><LinkText>1</LinkText></URL> , <URL><Link>../www/SideLinks/About/aboutRandomComplexes.html</Link><LinkText>2</LinkText></URL> , <URL><Link>../www/SideLinks/About/aboutKnots.html</Link><LinkText>3</LinkText></URL>
</Description> </ManSection>
<ManSection> <Func Name="ChainComplex" Arg="Y"/> <Description> <P/> Inputs a regular CW-complex <M>Y</M> and returns the cellular chain complex of a CW-complex W whose cells correspond to the critical cells of <M>Y</M> with respect to some discrete vector field. If <M>Y</M> does not initially have a discrete vector field then one is constructed. <P/><B>Examples:</B> <URL><Link>../tutorial/chap1.html</Link><LinkText>1</LinkText></URL> , <URL><Link>../tutorial/chap3.html</Link><LinkText>2</LinkText></URL> , <URL><Link>../tutorial/chap4.html</Link><LinkText>3</LinkText></URL> , <URL><Link>../tutorial/chap10.html</Link><LinkText>4</LinkText></URL> , <URL><Link>../www/SideLinks/About/aboutMetrics.html</Link><LinkText>5</LinkText></URL> , <URL><Link>../www/SideLinks/About/aboutBredon.html</Link><LinkText>6</LinkText></URL> , <URL><Link>../www/SideLinks/About/aboutPersistent.html</Link><LinkText>7</LinkText></URL> , <URL><Link>../www/SideLinks/About/aboutCoveringSpaces.html</Link><LinkText>8</LinkText></URL> , <URL><Link>../www/SideLinks/About/aboutCoverinSpaces.html</Link><LinkText>9</LinkText></URL> , <URL><Link>../www/SideLinks/About/aboutCubical.html</Link><LinkText>10</LinkText></URL> , <URL><Link>../www/SideLinks/About/aboutSimplicialGroups.html</Link><LinkText>11</LinkText></URL> , <URL><Link>../www/SideLinks/About/aboutIntro.html</Link><LinkText>12</LinkText></URL>
</Description> </ManSection>
<ManSection> <Func Name="ChainComplexOfRegularCWComplex" Arg="Y"/> <Description> <P/> Inputs a regular CW-complex <M>Y</M> and returns the cellular chain complex of <M>Y</M>. <P/><B>Examples:</B> <URL><Link>../tutorial/chap1.html</Link><LinkText>1</LinkText></URL> , <URL><Link>../tutorial/chap10.html</Link><LinkText>2</LinkText></URL>
</Description> </ManSection>
<ManSection> <Func Name="FundamentalGroup" Arg="Y"/> <Func Name="FundamentalGroup" Arg="Y,n"/> <Description> <P/> Inputs a regular CW-complex <M>Y</M> and, optionally, the number of some 0-cell. It returns the fundamental group of <M>Y</M> based at the 0-cell <M>n</M>. The group is returned as a finitely presented group. If <M>n</M> is not specified then it is set <M>n=1</M>. The algorithm requires a discrete vector field on <M>Y</M>. If <M>Y</M> does not initially have a discrete vector field then one is constructed. <P/><B>Examples:</B> <URL><Link>../tutorial/chap1.html</Link><LinkText>1</LinkText></URL> , <URL><Link>../tutorial/chap2.html</Link><LinkText>2</LinkText></URL> , <URL><Link>../tutorial/chap3.html</Link><LinkText>3</LinkText></URL> , <URL><Link>../tutorial/chap4.html</Link><LinkText>4</LinkText></URL> , <URL><Link>../tutorial/chap5.html</Link><LinkText>5</LinkText></URL> , <URL><Link>../tutorial/chap11.html</Link><LinkText>6</LinkText></URL> , <URL><Link>../www/SideLinks/About/aboutLinks.html</Link><LinkText>7</LinkText></URL> , <URL><Link>../www/SideLinks/About/aboutPeripheral.html</Link><LinkText>8</LinkText></URL> , <URL><Link>../www/SideLinks/About/aboutCoveringSpaces.html</Link><LinkText>9</LinkText></URL> , <URL><Link>../www/SideLinks/About/aboutCoverinSpaces.html</Link><LinkText>10</LinkText></URL> , <URL><Link>../www/SideLinks/About/aboutQuandles.html</Link><LinkText>11</LinkText></URL> , <URL><Link>../www/SideLinks/About/aboutRandomComplexes.html</Link><LinkText>12</LinkText></URL> , <URL><Link>../www/SideLinks/About/aboutKnots.html</Link><LinkText>13</LinkText></URL>
</Description> </ManSection> </Section> </Chapter>