| Quellcodebibliothek Statistik Leitseite products/Sources/formale Sprachen/GAP/pkg/ibnp/doc/ (Algebra von RWTH Aachen Version 4.15.1©) Datei vom 11.8.2025 mit Größe 5 kB |
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Quelle manual.lab Sprache: unbekannt |
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\GAPDocLabFile{ibnp}
\makelabel{ibnp:Title page}{}{X7D2C85EC87DD46E5} \makelabel{ibnp:Abstract}{}{X7AA6C5737B711C89} \makelabel{ibnp:Copyright}{}{X81488B807F2A1CF1} \makelabel{ibnp:Acknowledgements}{}{X82A988D47DFAFCFA} \makelabel{ibnp:Table of Contents}{}{X8537FEB07AF2BEC8} \makelabel{ibnp:Introduction}{1}{X7DFB63A97E67C0A1} \makelabel{ibnp:History}{1.1}{X811375BC7CA25F51} \makelabel{ibnp:Using the packages GBNP and NMO}{2}{X86057870803DCA93} \makelabel{ibnp:Noncommutative polynomials (NPs)}{2.1}{X783C6EC87988B533} \makelabel{ibnp:Gröbner Bases}{2.2}{X7E4277497D877661} \makelabel{ibnp:Orderings for monomials}{2.3}{X7F82A3608248CD31} \makelabel{ibnp:Commutative Involutive Bases}{3}{X780AAD6F8095AE49} \makelabel{ibnp:Reduction Paths}{3.1}{X7BBDABD3799443BB} \makelabel{ibnp:An Example}{3.1.1}{X7B5623E3821CC0D0} \makelabel{ibnp:Commutative Involutive Divisions}{3.2}{X7E43F2087BC8B4F9} \makelabel{ibnp:Example}{3.2.1}{X85861B017AEEC50B} \makelabel{ibnp:Selecting a Division}{3.2.2}{X83A3B3F77C712DA1} \makelabel{ibnp:Selecting an Ordering}{3.2.3}{X785D706A86DD7343} \makelabel{ibnp:Computing a Commutative Involutive Basis}{3.3}{X864907F987701716} \makelabel{ibnp:Prolongations and Autoreduction}{3.3.1}{X7ACAA0847CC0DBCC} \makelabel{ibnp:A more detailed example}{3.3.3}{X831D45437DE37177} \makelabel{ibnp:Using homogeneous polynomials}{3.3.4}{X791740DF84B742A2} \makelabel{ibnp:Functions for Noncommutative Monomials}{4}{X872783907DFA29B7} \makelabel{ibnp:Basic functions for monomials}{4.1}{X846C3B0F79265278} \makelabel{ibnp:Predefined algebras}{4.1.1}{X84F106BB8093FCAE} \makelabel{ibnp:Functions for Noncommutative Polynomials}{5}{X7BD27C5585EF8629} \makelabel{ibnp:Basic functions for polynomials}{5.1}{X80FC94957D03EEA6} \makelabel{ibnp:Noncommutative Involutive Bases}{6}{X797E483A84214975} \makelabel{ibnp:Noncommutative Involutive Divisions}{6.1}{X7A86C2437F6EB83D} \makelabel{ibnp:Selecting a Division}{6.1.5}{X83A3B3F77C712DA1} \makelabel{ibnp:Computing a Noncommutative Involutive Basis}{6.2}{X80C3BE018688AFB7} \makelabel{ibnp:The Disjoint Cones Conditions}{6.3}{X7DB2608C86CA3B04} \makelabel{ibnp:Bibliography}{Bib}{X7A6F98FD85F02BFE} \makelabel{ibnp:References}{Bib}{X7A6F98FD85F02BFE} \makelabel{ibnp:Index}{Ind}{X83A0356F839C696F} \makelabel{ibnp:GitHub repository}{1}{X7DFB63A97E67C0A1} \makelabel{ibnp:NP2GP}{2.1}{X783C6EC87988B533} \makelabel{ibnp:GP2NP}{2.1}{X783C6EC87988B533} \makelabel{ibnp:conventional divisor}{3.2}{X7E43F2087BC8B4F9} \makelabel{ibnp:involutive divisor}{3.2}{X7E43F2087BC8B4F9} \makelabel{ibnp:CommutativeDivision}{3.2.2}{X83A3B3F77C712DA1} \makelabel{ibnp:orderings}{3.2.3}{X785D706A86DD7343} \makelabel{ibnp:PommaretDivision}{3.2.4}{X82712BA57EBE9170} \makelabel{ibnp:ThomasDivision}{3.2.5}{X8756720A86A6B125} \makelabel{ibnp:JanetDivision}{3.2.6}{X7E214DDF794BB14D} \makelabel{ibnp:DivisionRecord}{3.2.7}{X8781FDB7865FA48B} \makelabel{ibnp:DivisionRecordCP}{3.2.7}{X8781FDB7865FA48B} \makelabel{ibnp:IPolyReduce}{3.2.8}{X79F5892C80AE2667} \makelabel{ibnp:IPolyReduceCP}{3.2.8}{X79F5892C80AE2667} \makelabel{ibnp:LoggedIPolyReduce}{3.2.9}{X7A36AE827C4012FF} \makelabel{ibnp:LoggedIPolyReduceCP}{3.2.9}{X7A36AE827C4012FF} \makelabel{ibnp:IAutoreduce}{3.2.10}{X7C58A339832877E9} \makelabel{ibnp:IAutoreduceCP}{3.2.10}{X7C58A339832877E9} \makelabel{ibnp:InvolutiveBasis}{3.3.2}{X7B60A306820D4ED2} \makelabel{ibnp:InvolutiveBasisCP}{3.3.2}{X7B60A306820D4ED2} \makelabel{ibnp:homogeneous polynomials}{3.3.4}{X791740DF84B742A2} \makelabel{ibnp:AlgebraIBNP}{4.1.1}{X84F106BB8093FCAE} \makelabel{ibnp:PrintNM}{4.1.2}{X7D53D8657AEDFEB2} \makelabel{ibnp:PrintNMList}{4.1.2}{X7D53D8657AEDFEB2} \makelabel{ibnp:NM2GM}{4.1.3}{X7AD4CF167E6B7D2E} \makelabel{ibnp:NM2GMList}{4.1.3}{X7AD4CF167E6B7D2E} \makelabel{ibnp:GM2NM}{4.1.4}{X8719E2857E26325C} \makelabel{ibnp:GM2NMList}{4.1.4}{X8719E2857E26325C} \makelabel{ibnp:PrefixNM}{4.1.5}{X7F72641C8441204E} \makelabel{ibnp:SubwordNM}{4.1.5}{X7F72641C8441204E} \makelabel{ibnp:SuffixNM}{4.1.5}{X7F72641C8441204E} \makelabel{ibnp:SuffixPrefixPosNM}{4.1.6}{X8046DF397ACA0E5E} \makelabel{ibnp:SubwordPosNM}{4.1.7}{X82916CB37D346978} \makelabel{ibnp:IsSubwordNM}{4.1.7}{X82916CB37D346978} \makelabel{ibnp:LeadVarNM}{4.1.8}{X83CF80DD7CD5F166} \makelabel{ibnp:LeadExpNM}{4.1.8}{X83CF80DD7CD5F166} \makelabel{ibnp:TailNM}{4.1.8}{X83CF80DD7CD5F166} \makelabel{ibnp:DivNM}{4.1.9}{X7CECFE0C86895946} \makelabel{ibnp:MaxDegreeNP}{5.1.1}{X7A1E54F279CCCF65} \makelabel{ibnp:ScalarMulNP}{5.1.2}{X7903A443865A3471} \makelabel{ibnp:LtNPoly}{5.1.3}{X7996395279064998} \makelabel{ibnp:GtNPoly}{5.1.3}{X7996395279064998} \makelabel{ibnp:LowestLeadMonomialPosNP}{5.1.4}{X79B2E02082C8799E} \makelabel{ibnp:LeftDivision}{6.1.1}{X8593BCDB8402C46C} \makelabel{ibnp:RightDivision}{6.1.2}{X784AF6B87B2B5E5D} \makelabel{ibnp:LeftOverlapDivision}{6.1.3}{X7A979BF38311024C} \makelabel{ibnp:RightOverlapDivision}{6.1.4}{X83CE05CF7CB18611} \makelabel{ibnp:NoncommutativeDivision}{6.1.5}{X83A3B3F77C712DA1} \makelabel{ibnp:DivisionRecordNP}{6.1.6}{X86FAAD527E20A573} \makelabel{ibnp:IPolyReduceNP}{6.1.7}{X828DA2AE844847E9} \makelabel{ibnp:LoggedIPolyReduceNP}{6.1.8}{X78935EBD85A02F3F} \makelabel{ibnp:VerifyLoggedRecordNP}{6.1.9}{X7EBFCE307BE928BA} \makelabel{ibnp:IAutoreduceNP}{6.1.10}{X8189DEDD87CE1667} \makelabel{ibnp:InvolutiveBasisNP}{6.2.1}{X7A71E4CD7B43726B} \makelabel{ibnp:disjoint cones}{6.3}{X7DB2608C86CA3B04} \makelabel{ibnp:StrongLeftOverlapDivision}{6.3.1}{X7D87860878548EF2} \makelabel{ibnp:StrongRightOverlapDivision}{6.3.2}{X819FE8F87ACDB19C} [ Dauer der Verarbeitung: 0.22 Sekunden (vorverarbeitet) ] |
2026-03-28