Certain Number-Theoretic Episodes in Algebra R. Sivaramakrishnan Boca Raton London New York Chapman & Hall/CRC is an imprint of the Taylor & Francis Group, an informa business © 2007 by Taylor & Francis Group, LLC DK3054_C000.indd 5 08/16/2006 10:08:09 AM Chapman & Hall/CRC Taylor & Francis Group 6000 Broken Sound Parkway NW, Suite 300 Boca Raton, FL 33487‑2742 © 2007 by Taylor & Francis Group, LLC Chapman & Hall/CRC is an imprint of Taylor & Francis Group, an Informa business No claim to original U.S. Government works Printed in the United States of America on acid‑free paper 10 9 8 7 6 5 4 3 2 1 International Standard Book Number‑10: 0‑8247‑5895‑1 (Hardcover) International Standard Book Number‑13: 978‑0‑8247‑5895‑0 (Hardcover) This book contains information obtained from authentic and highly regarded sources. Reprinted material is quoted with permission, and sources are indicated. A wide variety of references are listed. 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Trademark Notice: Product or corporate names may be trademarks or registered trademarks, and are used only for identification and explanation without intent to infringe. Library of Congress Cataloging‑in‑Publication Data Sivaramakrishnan, R., 1936‑ Certain number‑theoretic episodes in algebra / R. Sivaramakrishnan. p. cm. ‑‑ (Pure and applied mathematics ; 286) Includes bibliographical references and indexes. ISBN 0‑8247‑5895‑1 (alk. paper) 1. Algebraic number theory. 2. Number theory. I. Title. II. Series. QA247.S5725 2006 512.7’4‑‑dc22 2006048994 Visit the Taylor & Francis Web site at http://www.taylorandfrancis.com and the CRC Press Web site at http://www.crcpress.com © 2007 by Taylor & Francis Group, LLC DK3054_C000.indd 6 08/16/2006 10:08:09 AM MONOGRAPHS AND TEXTBOOKS IN PURE AND APPLIED MATHEMATICS PURE AND APPLIED MATHEMATICS Recent Titles E. Hansen and G. W. 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Sivaramakrishnan, Certain Number-Theoretic Episodes in Algebra (2006) Aderemi Kuku, Representation Theory and Higher Algebraic K-Theory (2006) © 2007 by Taylor & Francis Group, LLC DK3054_C000.indd 2 08/16/2006 10:08:08 AM MONOGRAPHS AND TEXTBOOKS IN PURE AND APPLIED MATHEMATICS PURE AND APPLIED MATHEMATICS Recent Titles E. Hansen and G. W. Walster, Global Optimization Using Interval Analysis, Second Edition, Revised and Expanded (2004) A Program of Monographs, Textbooks, and Lecture Notes M. M. Rao, Measure Theory and Integration, Second Edition, Revised and Expanded (2004) W. J. Wickless, A First Graduate Course in Abstract Algebra (2004) EXECUTIVE EDITORS R. P. Agarwal, M. Bohner, and W-T Li, Nonoscillation and Oscillation Theory for Functional Differential Equations (2004) Earl J. Taft Zuhair Nashed J. Galambos and I. Simonelli, Products of Random Variables: Applications to Rutgers University University of Central Florida Problems of Physics and to Arithmetical Functions (2004) Piscataway, New Jersey Orlando, Florida Walter Ferrer and Alvaro Rittatore, Actions and Invariants of Algebraic Groups (2005) Christof Eck, Jiri Jarusek, and Miroslav Krbec, Unilateral Contact Problems: Variational Methods and Existence Theorems (2005) EDITORIAL BOARD M. M. Rao, Conditional Measures and Applications, Second Edition (2005) A. B. Kharazishvili, Strange Functions in Real Analysis, Second Edition (2006) M. S. 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Sivaramakrishnan, Certain Number-Theoretic Episodes in Algebra (2006) Aderemi Kuku, Representation Theory and Higher Algebraic K-Theory (2006) © 2007 by Taylor & Francis Group, LLC DK3054_C000.indd 3 08/16/2006 10:08:09 AM CATALYZEDANDSUPPORTEDBYTHE DEPARTMENTOFSCIENCEANDTECHNOLOGY UNDERITS UTILIZATIONOFSCIENTIFICEXPERTISEOFRETIREDSCIENTISTS SCHEME (USERSscheme) PROJECTNo: HR/UR/21/98 The author acknowledges with thanks the (cid:2)nancial support of the Department of Science and Technology under USERSscheme for under- taking the project for preparation of a monograph/textbook. But for the timely(cid:2)nancialhelpoftheDSTandtheencouraging lettersreceivedfrom Dr. Parveen Farooqui, Head, Human Resources Wing of DST,the task of implementation wouldnothavefoundful(cid:2)lment. R.Sivaramakrishnan © 2007 by Taylor & Francis Group, LLC Dedicatedtothememoryof myparents (late)R.R.RAMAKRISHNA AYYAR(1907(cid:150)1985) & (late)T.S.LAKSHMYAMMAL(1911(cid:150)1975) and thefollowingteachers (late)P.I.IKKORAN,P.SANKARANNAIR & S.PARAMESWARAIYER (inhighschoolclasses) (late)K.GOPALAPANICKER,T.S.RAMANATHAIYER, N.P.SUBRAMANIAIYER,P.ACHUTHANPILLAI, K.X.JOHN,N.P.INASU&V.KARUNAKARAMENON (incollegeclasses) and (late)C.S.VENKATARAMAN(thesisadviser), (late)P.KESAVAMENON,K.NAGESWARARAO&N.V.BEERAN eachoneofwhomin(cid:3)uencedtheauthorinlearningaboutrigourin mathematicstherightway. © 2007 by Taylor & Francis Group, LLC ACKNOWLEDGEMENT Theauthorwishestoexpresshisdeepsenseofgratitudetotheauthoritiesofthe UniversityofCalicutforhavinggivenhimtheopportunitytoutilizethefacilities attheCalicutUniversityCampusingeneralandattheMathematicsDepartment inparticular. Thanksaredueto (1) Prof. V.Krishnakumarforhishelpandguidanceataverypersonalleveland inhiscapacityasHead,DepartmentofMathematics (2) Dr. P. T. Ramachandran for valuable discussions and Sri. Kuttappan C, Librarian in the Department of Mathematics for having provided abundant helpinthematteroflibraryreference (3) theDeputyRegistrar, Pl.D Branchandhiscolleaguesformattersofof(cid:2)cial correspondence (4) theFinanceOf(cid:2)cerandhisstaffforprocessingbills andvouchersandsuch othertransactions. Many academicians and friends have offered help at various stages in the progressoftheproject. The author had the opportunity to visit Mangalore University, Mangalore (Karnataka)during 1996(cid:150)97. It was during this period that the spade work for theprojectwasdone,andtheencouragementreceivedfromProf. B.G.Shenoy and Prof. Juliet Britto was of great help. The author thanks the Faculty of the DepartmentofMathematics,MangaloreUniversityfortheinvitationtostayand workforayear. Thanksaredueto (i) Prof. C.S.SeshadriFRS,Director,ChennaiMathematicalInstitute,Chen- naiforarrangingavisittothelibraryoftheInstitute (ii) Prof. R.SridharanandProf. K.R.NagarajanofChennaiMathematicalIn- stituteforadviceabouttheinclusionofcertaintopics/papersinthesections onthePellequationandringswithchainconditions (iii) Prof. R. Balasubramanian, Director, Institute of Mathematical Sciences (MATSCIENCE) for valuable comments in the choice of topics in Alge- braicNumberTheory (iv) Prof. M.ThampanNair andProf. C. Ponnuswamyforhelpinconnection withavisittoI.I.T(Madras),Chennai (v) Prof. T.ThrivikramanandProf. R.S.ChakravartiofCochinUniversityof ScienceandTechnology,Kochifortheirscholarlysuggestionsandremarks (vi) Prof. M.I.JinnahandProf. A.R.Rajanforfacilitatingtheauthor’svisitto theMathematicsDepartment,UniversityofKerala,Thiruvananthapuram (vii) Dr. Rajendran Valiaveetil for all the help renderedby way of discussions and for having assisted the author by going through the (cid:2)rst draft of the manuscriptandformakingsuggestionsaboutthesimpli(cid:2)cationofproofsof sometheorems © 2007 by Taylor & Francis Group, LLC (viii) Prof.PenttiHaukkanenoftheUniversityofTampere,Finlandand Prof. S. A.Katre ofthe UniversityofPoona, Puneforsendingreprintsof theirarticlestotheauthor (ix) Prof. DonRedmondofSouthernIllinoisUniversity,Carbondaleforhaving suppliedthereferencesrelatingtotheGoldbachconjecture (x) Prof.V.K.Balachandran,formerDirector,RamanujanInstitutefor Advanced Study, Chennai for help received by way of discussions and correspondence (xi) Dr.N.Raju,Head,DepartmentofStatistics,UniversityofCalicutfortimely helpandadviceinthematteroftypesettingandformatofthemanuscript. © 2007 by Taylor & Francis Group, LLC PREFACE Thismonographisanattempttojustifythefollowingassertion: (cid:147)Itisdesir- abletolearnalgebravianumbertheoryandtolearnnumbertheoryviaalgebra(cid:148). Many concepts in commutative algebra such as Euclidean domains, prime andprimaryideals,(cid:2)eldofquotientsofanintegraldomainandsuchothershave originatedfromnotionsinnumbertheory.Foronewhogoesdeeperintothe(cid:2)ner aspectsofnumbertheory,algebraictechniqueswouldappeartobepowerfuland elegant.ExamplesarefromthecrispproofsofGauss’squadraticreciprocitylaw, Fermat’sTwo-squarestheoremandLagrange’stheoremontheexpressibilityofa positiveintegerasasumoffoursquares.Thoughallauthorsofbooksonnumber theoryhaveemphasizedthisaspect,perhaps,twobooksthatmakethealgebraic approachexplicitare 1. EthanD.Bolker:ElementaryNumberTheory(cid:151)anAlgebraicApproach W.A.BenjaminInc.NY(1970)and 2. F.Richman:NumberTheory(cid:151)AnIntroductiontoAlgebra Brooks/ColeMonterey/California(1971). ItistruethatclassicaltextbookssuchasO.ZariskiandP.Samuel: Commutative Algebra Vols I and II (SpringerVerlag GTM Nos. 28, 29 (1982) original versionVan Nostrand Edition (1958))and K. Ireland and M. I. Rosen: AClassicalIntroductiontoModernNumberTheory,2ndEdition,SpringerVerlag GTM No. 84 (1985) original version: Bogden and Quigley Inc., Publishers, Tarrytown-on-Hudson,NY(1972)conveythemessageofdoingalgebrawithfull number-theoreticsupportandviceversaexceedinglywell. Theaimofthismonographistospreadthismessagewithgreateremphasis. It is forthe mathematicalcommunity,at large, to pass judgementas to howfar thedesiredgoalhasbeenachieved. Thismonographpresupposesrudimentaryknowledgeofelementarynumber theoryaswellasalgebraonthepartofthereader.Themainthemeisthestudyof (i) theringZofintegers (ii) theChineseRemainderTheoremandreciprocitylaws (iii) (cid:2)nitegroupsfromthepointofviewofenumeration (iv) abstractM(cid:246)biusInversion (v) theroleofgeneratingfunctions (vi) ringsofarithmeticfunctionsand (vii) certainanaloguesoftheGoldbachproblem. Manyinterestingtopicssuch as p-adic(cid:2)elds, cyclotomy,Emil Artin’s con- jectureandFermat’sLastTheorem(FLT)havenotbeendiscussedindetail.How- ever,theoverallpictureiswhatonegetsabouttheniceinterconnectionsbetween numbertheoryandalgebra. The monographhas been divided into four parts containing 16 chapters in all.Eachchapterbeginswitha‘historicalperspective’andclosesbygiving‘notes withillustrativeexamples/worked-outexample(s)’. PartIdealingwithelements © 2007 by Taylor & Francis Group, LLC ofnumbertheoryandalgebracontainssevenchapters. Thedetailsaregivenbe- low. PARTI ELEMENTSOFNUMBERTHEORYANDALGEBRA Chapter1:TheoremsofEuler,FermatandLagrange Certainnewproofsofclassical theoremsofnumbertheoryarepointedout. Using a counting principle of Melvin Hausner, the theorems of Fermat and Lucas are proved. D. Zagier’s proofof Fermat’s two-squarestheorem is given. Lagrange’s four-squares theorem is deduced from the fact that a certain 2 2 (cid:2) matrixwithentriesfromZ[i]hasafactorizationofthetypeBB(cid:3) whenB(cid:3) isthe adjoint (conjugate transpose of B). Linear Diophantine equations are also dis- cussed. Chapter2:Theintegraldomainofrationalintegers Zisshownasanorderedintegraldomain. Itisprovedthatanorderedinte- graldomainwhosesubsetofpositiveelementsiswell-ordered,isthesameasZ, up to isomorphism. Operations on ideals of a commutative ring with unity are described. Theygiveanaloguesof g.c.d. and l.c.m. of integers. In the case of anintegraldomain,characterizationsofirreduciblesandprimesareshown. The criterionforanintegraldomaintosatisfyUFDpropertyisgiven.Thenotionofa GCDdomainisalsopointedout. Chapter3:Euclideandomains ZisaEuclideandomain.Theringofalgebraicintegersofaquadraticnumber (cid:2)eld Q(pm) is a Euclidean domain when m=-1;-2;-3;-7and -11. ‘Almost Euclidean’domainsarediscussed. ItisprovedthattheringR(-19)ofalgebraic integersofQ(p-19)isaPID,butnotaEuclideandomain.Further,Zisshownto betheuniqueEuclideandomainhaving‘double-remainderproperty’. Chapter4:Ringsofpolynomialsandformalpowerseries Polynomialringsareintroduced.IfFisa(cid:2)eld,theuniquenessofthedivision algorithmin F[x] characterizesF[x] amongEuclideandomains. The ring of A arithmetic functions under the operations of addition and Dirichlet convolution is shown to be a UFD via the ring C! of formalpower series (overthe (cid:2)eld C ofcomplexnumbers)incountablyin(cid:2)niteindeterminates. Thissigni(cid:2)cantresult is due to E. D. Cashwell and C.J.Everett. See ‘The ring of number-theoretic functions’,Paci(cid:2)cJ.Math9(1959)975(cid:150)985. Next, we give a formula for the number of monic irreducible polynomials of degree m (>0) over the (cid:2)nite (cid:2)eld Z=pZ (where p is a prime) via M(cid:246)bius inversion. It is deducedthat the numberof monicirreduciblepolynomialsover Z=pZisin(cid:2)nite. © 2007 by Taylor & Francis Group, LLC