undFt{AlgebrasGandriedricCliordonTheoryamDissertationurzurderErlangunghiller{UnivdesJena.akHUBERademiscgebhenAugsburgGradesindoMathematikctorInformatikrerumFnaturaliumh{Sc(Dr.ersirer.atnat.)vvDipl.-Math.orgelegtTdemOTTNERRatorender4.5.1967FakultatfTDr.h28.1.1997ter:V1.R.Prof.desDr.agB.tlicK6.2.1997G.ulshammerRobinson2.agProf.Rigorosums:Dr.TJ.derL.oenAlphenerinerteidigung:3.GutacProf.yablecriteriontenAtsInductionInrevisitedtroRepresenductionringiijectivitPreliminarieseddingsandindecompnotationcvIChapterinductionI.forTheinductioncategoriesi1611.SQ{emThe2.sk3.ewygroup4.algebraof1962.IS{,ringsQ{113andoSQ{idempcoten2.ts1174Index3.proS{,yQ{1.andofSQ{homomorphismsb12614.Higman'sSome77functorsGreen'sandosabilitconstructionstheorem18855.BrauerMoritaharacterstheorysolvforgroupsGChapter{algebrasI28.6.tationTheandcategorytheoremsof1.SQ{emmbduleeddingsthe45haracterChapter113ILiftingItheorems.BibliographInduction121and122relativConeevregardtstrooutductionThisOriginallyof,iftheur),notionInofsubgroupamighGE{algebra(or,wGastoinwithouttrofarducedwithbtheoryyG=Greenintoon'tproi.e.