<html><head><title>SONATA : a GAP 4 package - Index I</title></head> <body text="#000000" bgcolor="#ffffff"> <h1><font face="Gill Sans,Helvetica,Arial">SONATA</font> : a <font face="Gill Sans,Helvetica,Arial">GAP</font> 4 package - Index I</h1> <p> <a href="theindex.htm">_</A> <a href="indxA.htm">A</A> <a href="indxB.htm">B</A> <a href="indxC.htm">C</A> <a href="indxD.htm">D</A> <a href="indxE.htm">E</A> <a href="indxF.htm">F</A> <a href="indxG.htm">G</A> <a href="indxI.htm">I</A> <a href="indxL.htm">L</A> <a href="indxM.htm">M</A> <a href="indxN.htm">N</A> <a href="indxO.htm">O</A> <a href="indxP.htm">P</A> <a href="indxQ.htm">Q</A> <a href="indxR.htm">R</A> <a href="indxS.htm">S</A> <a href="indxT.htm">T</A> <a href="indxU.htm">U</A> <a href="indxW.htm">W</A> <a href="indxZ.htm">Z</A> <dt>Ideals of N-groups <a href="CHAP008.htm#SECT006">8.6</a> <dt>IdempotentElements <a href="CHAP002.htm#SECT022">2.22</a> <dt>Identifying nearrings <a href="CHAP003.htm#SECT002">3.2</a> <dt>Identity <a href="CHAP002.htm#SECT019">2.19</a> <dt>Identity of a nearring <a href="CHAP002.htm#SECT019">2.19</a> <dt>IdentityEndoMapping <a href="CHAP004.htm#SECT001">4.1</a> <dt>IdLibraryNearRing <a href="CHAP003.htm#SECT002">3.2</a> <dt>IdLibraryNearRingWithOne <a href="CHAP003.htm#SECT002">3.2</a> <dt>IdTWGroup <a href="CHAP001.htm#SECT001">1.1</a> <dt>in <a href="CHAP006.htm#SECT007">6.7</a> <dt>IncidenceMat <a href="CHAP011.htm#SECT002">11.2</a> <dt>Inner automorphisms of a group <a href="CHAP001.htm#SECT005">1.5</a> <dt>InnerAutomorphismNearRing <a href="CHAP005.htm#SECT002">5.2</a> <dt>InnerAutomorphisms <a href="CHAP001.htm#SECT005">1.5</a> <dt>Intersection <a href="CHAP006.htm#SECT011">6.11</a> <dt>Intersection of nearrings <a href="CHAP002.htm#SECT018">2.18</a> <dt>Intersection, for nearring ideals <a href="CHAP006.htm#SECT011">6.11</a> <dt>Intersection, for nearrings <a href="CHAP002.htm#SECT018">2.18</a> <dt>Invariant subgroups <a href="CHAP001.htm#SECT009">1.9</a> <dt>Invariant subnearrings <a href="CHAP002.htm#SECT016">2.16</a> <dt>InvariantSubNearRings <a href="CHAP002.htm#SECT016">2.16</a> <dt>Is1AffineComplete <a href="CHAP005.htm#SECT002">5.2</a> <dt>Is2TameNGroup <a href="CHAP008.htm#SECT007">8.7</a> <dt>Is3TameNGroup <a href="CHAP008.htm#SECT007">8.7</a> <dt>IsAbelianNearRing <a href="CHAP002.htm#SECT023">2.23</a> <dt>IsAbstractAffineNearRing <a href="CHAP002.htm#SECT023">2.23</a> <dt>IsBooleanNearRing <a href="CHAP002.htm#SECT023">2.23</a> <dt>IsCharacteristicInParent <a href="CHAP001.htm#SECT009">1.9</a> <dt>IsCharacteristicSubgroup <a href="CHAP001.htm#SECT009">1.9</a> <dt>IsCircularDesign <a href="CHAP011.htm#SECT002">11.2</a> <dt>IsCommutative <a href="CHAP002.htm#SECT023">2.23</a> <dt>IsCompatible <a href="CHAP008.htm#SECT007">8.7</a> <dt>IsCompatibleEndoMapping <a href="CHAP005.htm#SECT002">5.2</a> <dt>IsConstantEndoMapping <a href="CHAP004.htm#SECT002">4.2</a> <dt>IsDgNearRing <a href="CHAP002.htm#SECT023">2.23</a> <dt>IsDistributiveEndoMapping <a href="CHAP004.htm#SECT002">4.2</a> <dt>IsDistributiveNearRing <a href="CHAP002.htm#SECT021">2.21</a> <dt>IsEndoMapping <a href="CHAP004.htm#SECT001">4.1</a> <dt>IsExplicitMultiplicationNearRing <a href="CHAP002.htm#SECT002">2.2</a> <dt>IsFpfAutomorphismGroup <a href="CHAP009.htm#SECT001">9.1</a> <dt>IsFpfRepresentation <a href="CHAP009.htm#SECT002">9.2</a> <dt>IsFullinvariant <a href="CHAP001.htm#SECT009">1.9</a> <dt>IsFullinvariantInParent <a href="CHAP001.htm#SECT009">1.9</a> <dt>IsFullTransformationNearRing <a href="CHAP005.htm#SECT002">5.2</a> <dt>IsIdentityEndoMapping <a href="CHAP004.htm#SECT002">4.2</a> <dt>IsIntegralNearRing <a href="CHAP002.htm#SECT023">2.23</a> <dt>IsInvariantUnderMaps <a href="CHAP001.htm#SECT009">1.9</a> <dt>IsIsomorphicGroup <a href="CHAP001.htm#SECT006">1.6</a> <dt>IsIsomorphicNearRing <a href="CHAP002.htm#SECT014">2.14</a> <dt>IsLibraryNearRing <a href="CHAP003.htm#SECT003">3.3</a> <a href="CHAP003.htm#SECT003">3.3</a> <dt>IsMaximalNearRingIdeal <a href="CHAP006.htm#SECT003">6.3</a> <dt>IsMonogenic <a href="CHAP008.htm#SECT007">8.7</a> <dt>IsN0SimpleNGroup <a href="CHAP008.htm#SECT006">8.6</a> <dt>IsNearField <a href="CHAP002.htm#SECT023">2.23</a> <dt>IsNearRing <a href="CHAP002.htm#SECT002">2.2</a> <dt>IsNearRingIdeal <a href="CHAP006.htm#SECT002">6.2</a> <dt>IsNearRingLeftIdeal <a href="CHAP006.htm#SECT002">6.2</a> <dt>IsNearRingMultiplication <a href="CHAP002.htm#SECT001">2.1</a> <dt>IsNearRingRightIdeal <a href="CHAP006.htm#SECT002">6.2</a> <dt>IsNearRingUnit <a href="CHAP002.htm#SECT020">2.20</a> <dt>IsNearRingWithOne <a href="CHAP002.htm#SECT019">2.19</a> <dt>IsNGroup <a href="CHAP008.htm#SECT003">8.3</a> <dt>IsNIdeal <a href="CHAP008.htm#SECT006">8.6</a> <dt>IsNilNearRing <a href="CHAP002.htm#SECT023">2.23</a> <dt>IsNilpotentFreeNearRing <a href="CHAP002.htm#SECT023">2.23</a> <dt>IsNilpotentNearRing <a href="CHAP002.htm#SECT023">2.23</a> <dt>IsNRI <a href="CHAP006.htm#SECT002">6.2</a> <dt>IsNSubgroup <a href="CHAP008.htm#SECT004">8.4</a> <dt>Isomorphic groups <a href="CHAP001.htm#SECT006">1.6</a> <dt>Isomorphic nearrings <a href="CHAP002.htm#SECT014">2.14</a> <dt>IsPairOfDicksonNumbers <a href="CHAP010.htm#SECT001">10.1</a> <dt>IsPlanarNearRing <a href="CHAP002.htm#SECT023">2.23</a> <dt>IsPointIncidentBlock <a href="CHAP011.htm#SECT003">11.3</a> <dt>IsPrimeNearRing <a href="CHAP002.htm#SECT023">2.23</a> <dt>IsPrimeNearRingIdeal <a href="CHAP006.htm#SECT003">6.3</a> <dt>IsQuasiregularNearRing <a href="CHAP002.htm#SECT023">2.23</a> <dt>IsRegularNearRing <a href="CHAP002.htm#SECT023">2.23</a> <dt>IsSimpleNearRing <a href="CHAP006.htm#SECT013">6.13</a> <dt>IsSimpleNGroup <a href="CHAP008.htm#SECT006">8.6</a> <dt>IsStronglyMonogenic <a href="CHAP008.htm#SECT007">8.7</a> <dt>IsSubgroupNearRingLeftIdeal <a href="CHAP006.htm#SECT002">6.2</a> <dt>IsSubgroupNearRingRightIdeal <a href="CHAP006.htm#SECT002">6.2</a> <dt>IsTameNGroup <a href="CHAP008.htm#SECT007">8.7</a> <dt>IsWdNearRing <a href="CHAP002.htm#SECT023">2.23</a> </dl><p> [<a href="chapters.htm">Up</a>]<p> <P> <address>SONATA manual<br>November 2008 </address></body></html>