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Analytic Number Theory, Approximation Theory, and Special Functions: In Honor of Hari M. Srivastava PDF

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Gradimir V. Milovanović Michael Th. Rassias Editors Analytic Number Theory, Approximation Theory, and Special Functions In Honor of Hari M. Srivastava Analytic Number Theory, Approximation Theory, and Special Functions Gradimir V. Milovanovic´ (cid:129) Michael Th. Rassias Editors Analytic Number Theory, Approximation Theory, and Special Functions In Honor of Hari M. Srivastava 123 Editors GradimirV.Milovanovic´ MichaelTh.Rassias MathematicalInstitute ETH-Zürich SerbianAcademyofSciencesandArts DepartmentofMathematics Belgrade,Serbia Zürich,Switzerland ISBN978-1-4939-0257-6 ISBN978-1-4939-0258-3(eBook) DOI10.1007/978-1-4939-0258-3 SpringerNewYorkHeidelbergDordrechtLondon LibraryofCongressControlNumber:2014931380 MathematicsSubjectClassification(2010):05Axx,11xx,26xx,30xx,31Axx,33xx,34xx,39Bxx,41xx, 44Axx,65Dxx ©SpringerScience+BusinessMediaNewYork2014 Thisworkissubjecttocopyright.AllrightsarereservedbythePublisher,whetherthewholeorpartof thematerialisconcerned,specificallytherightsoftranslation,reprinting,reuseofillustrations,recitation, broadcasting,reproductiononmicrofilmsorinanyotherphysicalway,andtransmissionorinformation storageandretrieval,electronicadaptation,computersoftware,orbysimilarordissimilarmethodology nowknownorhereafterdeveloped.Exemptedfromthislegalreservationarebriefexcerptsinconnection with reviews or scholarly analysis or material supplied specifically for the purpose of being entered and executed on a computer system, for exclusive use by the purchaser of the work. Duplication of this publication or parts thereof is permitted only under the provisions of the Copyright Law of the Publisher’slocation,initscurrentversion,andpermissionforusemustalwaysbeobtainedfromSpringer. PermissionsforusemaybeobtainedthroughRightsLinkattheCopyrightClearanceCenter.Violations areliabletoprosecutionundertherespectiveCopyrightLaw. Theuseofgeneraldescriptivenames,registerednames,trademarks,servicemarks,etc.inthispublication doesnotimply,evenintheabsenceofaspecificstatement,thatsuchnamesareexemptfromtherelevant protectivelawsandregulationsandthereforefreeforgeneraluse. While the advice and information in this book are believed to be true and accurate at the date of publication,neithertheauthorsnortheeditorsnorthepublishercanacceptanylegalresponsibilityfor anyerrorsoromissionsthatmaybemade.Thepublishermakesnowarranty,expressorimplied,with respecttothematerialcontainedherein. Printedonacid-freepaper SpringerispartofSpringerScience+BusinessMedia(www.springer.com) Preface The volume “Analytic Number Theory, Approximation Theory, and Special Functions” consists of 35 articles written by eminent scientists from the international mathematical community, who present both research and survey works. The volume is dedicated to professor Hari M. Srivastava in honor of his outstandingworkinmathematics. ProfessorHariMohanSrivastavawasbornonJuly5,1940,atKaroninDistrict Ballia of the province of Uttar Pradesh in India. He studied at the University of Allahabad, India, where he obtained his B.Sc. in 1957 and M.Sc. in 1959. He receivedhisPh.D.fromtheJodhpurUniversity(nowJaiNarainVyasUniversity), India,in1965.Hebegunhisuniversity-levelteachingcareerattheageof19. H. M. Srivastava joined the Faculty of Mathematics and Statistics of the University of Victoria in Canada as associate professorin 1969 and then as a full professorin 1974. He is an EmeritusProfessor at the University of Victoria since 2006. ProfessorSrivastavahasheldseveralvisitingpositionsinuniversitiesoftheUSA, Canada,theUK,andmanyothercountries. Hehaspublished21booksandmonographsandeditedvolumesbywell-known international publishers, as well as over 1,000 scientific research journal articles in pure and applied mathematicalanalysis He has served or currently is an active member of the editorial board of several international journals in mathematics. It is worth mentioning that he has published jointly with more than 385 scientists, includingmathematicians,statisticians,physicists,andastrophysicists,fromseveral partsoftheworld.ProfessorSrivastavahassupervisedseveralgraduatestudentsin numerousuniversitiestowardstheirmaster’sandPh.D.degrees. ProfessorSrivastavahasbeenbestowedseveralawardsincludingmostrecently the NSERC 25-Year Award by the University of Victoria, Canada (2004), the Nishiwaki Prize, Japan (2004), Doctor Honoris Causa from the Chung Yuan Christian University, Chung-Li, Taiwan, Republic of China (2006), and Doctor HonorisCausafromtheUniversityofAlbaIulia,Romania(2007). ThenameofprofessorSrivastavahasbeenassociatedwithseveralmathematical terms, including Carlitz–Srivastava polynomials, Srivastava–Panda multivariable v vi Preface H-function, Srivastava–Agarwal basic (or q-) generating function, Srivastava– Buschman polynomials, Chan–Chyan–Srivastava polynomials, Srivastava–Wright operators, Choi–Srivastava methods in Analytic Number Theory, and Wu– Srivastavainequalityforhighertranscendentalfunctions. In this volume dedicated to professor Srivastava an attempt has been made to discuss essential developmentsin mathematicalresearch in a varietyof problems, mostofwhichhaveoccupiedtheinterestofresearchersforlongstretchesoftime. Someofthecharacteristicfeaturesofthisvolumecanbesummarizedasfollows: – Presentsmathematicalresultsandopenproblemsinasimpleandself-contained manner. – Containsnewresultsinrapidlyprogressingareasofresearch. – Providesanoverviewofoldandnewresults,methods,andtheoriestowardsthe solutionoflong-standingproblemsinawidescientificfield. Thebookconsistsofthefollowingfiveparts: 1. Analytic Number Theory, Combinatorics, and Special Sequences of Numbers andPolynomials 2. AnalyticInequalitiesandApplications 3. ApproximationofFunctionsandQuadratures 4. Orthogonality,Transformations,andApplications 5. SpecialandComplexFunctionsandApplications Part I consists of nine contributions. A. Ivic´ presents a survey with a detailed discussionofpowermomentsoftheRiemannzetafunction(cid:2).s/,whensliesonthe “criticalline”<s D1=2.Itincludesearlyresults,themeansquareandmeanfourth power,highermoments,conditionalresults,andsomeopenproblems.M. Hassani givessomeexplicitupperandlowerboundsfor(cid:3) ,where0 <(cid:3) < (cid:3) <(cid:3) < (cid:2)(cid:2)(cid:2) n 1 2 3 are consecutive ordinates of nontrivial zeros (cid:4) D ˇ C i(cid:3) of the Riemann zeta function,includingthe asymptoticrelation(cid:3) log2n(cid:3)2(cid:5)nlogn (cid:4) 2(cid:5)nloglogn n as n ! 1. Y. Ihara and K. Matsumoto prove an unconditional basic result related to the value-distributions of f.L0=L/.s;(cid:6)/g and of f.(cid:2)0=(cid:2)/.s C i(cid:7)/g , (cid:6) (cid:7) where (cid:6) runs over Dirichlet characters with prime conductors and (cid:7) runs over R. J. Choi presents a survey on recent developments and applications of the simple and multiple gamma functions (cid:8) , including results on multiple Hurwitz n zeta functions and generalized Goldbach–Euler series. A. A. Bytsenko and E. Elizaldeconsiderapartitionfunctionofhyperbolicthree-geometryandassociated Hilbertschemes. In particular,the role of (Selberg-type)Ruelle spectral functions of hyperbolic geometry for the calculation of partition functions and associated q-series is discussed. Y. Simsek considers families of twisted Bernoulli numbers and polynomials and their applications. Several relationships between Bernoulli functions, Euler functions, some arithmetic sums, Dedekind sums, Hardy Berndt sums, DC-sums, trigonometric sums, and Hurwitz zeta function are given. A. K. AgarwalandM.Ranadiscussacombinatorialinterpretationofageneralizedbasic series. Namely, using a bijection between the Bender–Knuth matrices and the n- colorpartitionsestablishedbyAgarwal(ARSCombinatoria61,97–117,2001),they Preface vii extendarecentresulttoa3-wayinfinitefamilyofcombinatorialidentities.A.Sofo proves some identities for reciprocal binomial coefficients, and M. Merca shows thattheq-Stirlingnumberscanbeexpressedintermsoftheq-binomialcoefficients andviceversa. Part II is dedicated to analytic inequalities and several applications. Ibrahim and Dragomir give a survey of some recent results for the celebrated Cauchy– Bunyakovsky–Schwarz inequality for functions defined by power series with nonnegative coefficients. G. D. Anderson, M. Vuorinen, and X. Zhang provide a survey of recent results in special functions of classical analysis and geometric function theory, in particular the circular and hyperbolic functions, the gamma function,theellipticintegrals,theGaussianhypergeometricfunction,powerseries, and mean values. M. Merkle gives a collection of some selected facts about the completely monotone (CM) functions that can be found in books and papers devotedto differentareasof mathematics. In particular,he emphasizesthe role of representation of a CM function as the Laplace transform of a measure and also presentsanddiscussesalittleknownconnectionwithlog-convexity.S.Abramovich considers results on superquadracity, especially those related to Jensen, Jensen– Steffensen, and Hardy’s inequalities. S. Ding and Y. Xing present an up-to-date accountoftheadvancesmadeinthestudyofLp theoryofGreen’soperatorapplied todifferentialforms,includingLp-estimates,LipschitzandBMOnorminequalities, as well as inequalities with Lp.logL/˛ norms. B. Yang uses methods of weight coefficients and techniques of real analysis to derive a multidimensional discrete Hilbert-type inequality with a best possible constant factor. F. Qi, Q.-M. Luo, andB.-N.Guoestablish sufficientandnecessaryconditionssuchthatthe function .e˛t(cid:3)eˇt/=.e(cid:9)t(cid:3)e(cid:10)t/ismonotonic,logarithmicconvex,logarithmicconcave,3-log- convex,and 3-log-concave on R. P. Cerone obtains approximationand boundsof theGinimeandifferenceandprovidesareviewofrecentdevelopmentsinthearea. Finally,M.A.Noorconsiderstheparametricnonconvexvariationalinequalitiesand parametricnonconvexWiener–Hopfequations.Using the projectiontechnique,he establishestheequivalencebetweenthem. ApproximationoffunctionsandquadraturesistreatedinPartIII.N.K.Goviland V. Gupta discussStancu-typegeneralizationof operatorsintroducedby Srivastava and Gupta (Math. Comput. Modelling 37, 1307–1315, 2003). M. Mursaleen and S. A. Mohiuddine prove the Korovkin-type approximation theorem for functions of two variables, using the notion of statistical summability .C;1;1/, recently introducedbyMoricz(J. Math.Anal.Appl.286,340–350,2003).In1961,Baker, Gammel, and Wills formulated their famous conjecture that if a function f is meromorphicin the unitballand analyticat 0,then a subsequenceof its diagonal Padé approximantsconvergesuniformlyin compactsubsetsto f. This conjecture wasdisprovedin2001,butitgeneratedanumberofrelatedunresolvedconjectures. D.S. Lubinskyreviewstheirstatus. A.R. Hayotov,G. V.Milovanovic´,andK.M. Shadimetov construct the optimal quadrature formulas in the sense of Sard, as wellasinterpolationsplinesminimizingthesemi-norminthespaceK .P /,where 2 2 K2.P2/isaspacReoffunctions' which'0 isabsolutelycontinuousand'00belongs toL .0;1/and 1.'00.x/C!2'.x//2dx < 1.Finally,asurveyonsomespecific 2 0 viii Preface nonstandard methods for numerical integration of highly oscillating functions, mainlybasedonsomecontourintegrationmethodsandapplicationsofsomekinds of Gaussian quadratures, including complex oscillatory weights, is presented by G.V.Milovanovic´andM.P.Stanic´. In Part IV, C. Ferreira, J. L. López, and E. Pérez Sinusía study asymptotic reductionsbetweentheWilsonpolynomialsandthelower-levelpolynomialsofthe Askeyscheme,andK.Castillo, L.Garza,andF. Marcellánanalyzea perturbation of a nontrivialprobability measure d(cid:10) supported on an infinite subset on the real line,whichconsistsoftheadditionofatime-dependentmasspoint.A.F.Loureiro andS.YakubovichconsiderspecialcasesofBoas–Buck-typepolynomialsequences andanalyzesomeexamplesofgeneralizedhypergeometric-typepolynomials.P.W. Karlsson gives an analysis of Goursat’s hypergeometric transformations, and A. Kılıçmanconsiderspartialdifferentialequations(PDE)withconvolutiontermand proposes a new method for solving PDE. Finally, using the fixed point method, C. Park proves the Hyers–Ulam stability of the orthogonally additive–additive functionalequation. Specialfunctionsandcomplexfunctionswithseveralapplicationsarepresented inPartV.Á.Baricz,P.L.Butzer,andT.K.Pogányhaveprovidedageneralization of the complete Butzer–Flocke–Hauss (BFH) ˝-function in a natural way by using two approaches and obtain several interesting properties. Á. Baricz and T. K. Pogány consider properties of the product of modified Bessel functions and establish discrete Chebyshev-type inequalities for sequences of modified Bessel functions of the first and second kind. S. Porwal and D. Breaz investigate the mapping properties of an integral operator involving Bessel functions of the first kind on a subclass of analytic univalent functions. V. V. Mityushev introduces and uses the Poincaré ˛-series (˛ 2 Rn) for classical Schottky groups in order to solve Riemann–Hilbert problems for n-connected circular domains. He also gives a fast algorithm for the computation of Poincaré series for disks that are close to each other. N. E. Cho considers inclusion properties for certain classes of meromorphic multivalent functions. He introduces several new subclasses of meromorphicmultivalentfunctionsandinvestigatesvariousinclusionpropertiesof thesesubclasses.Finally,I.LahiriandA.BanerjeediscusstheinfluenceofGross- problemonthesetsharingofentireandmeromorphicfunctions.Itishopethatthe bookwillbeparticularlyusefultoresearchersandgraduatestudentsinmathematics, physics,andothercomputationalandappliedsciences. Finally, we wish to express our deepest appreciation to all the mathematicians from the international mathematical community, who contributed their papers for publication in this volume dedicated to Hari M. Srivastava, as well as to the refereesfortheircarefulreadingofthemanuscripts.Athankalsogoestoprofessor MarijaStanic´ (UniversityofKragujevac,Serbia),forherhelpduringthetechnical preparationofthe manuscript.Lastbutnotleast, we are verythankfulto Springer foritsgeneroussupportforthepublicationofthisvolume. Belgrade,Serbia GradimirV.Milovanovic´ Zürich,Switzerland MichaelTh.Rassias Contents PartI AnalyticNumberTheory,Combinatorics,andSpecial SequencesofNumbersandPolynomials TheMeanValuesoftheRiemannZeta-FunctionontheCriticalLine..... 3 AleksandarIvic´ ExplicitBoundsConcerningNon-trivialZerosoftheRiemann ZetaFunction..................................................................... 69 MehdiHassani On the Value-Distribution of Logarithmic Derivatives ofDirichletL-Functions......................................................... 79 YasutakaIharaandKohjiMatsumoto MultipleGammaFunctionsandTheirApplications......................... 93 JunesangChoi On PartitionFunctions of Hyperbolic Three-Geometry andAssociatedHilbertSchemes................................................ 131 A.A.BytsenkoandE.Elizalde FamiliesofTwistedBernoulliNumbers, TwistedBernoulli Polynomials,andTheirApplications .......................................... 149 YilmazSimsek CombinatorialInterpretationofaGeneralizedBasicSeries................ 215 A.K.AgarwalandM.Rana IdentitiesforReciprocalBinomials ............................................ 227 AnthonySofo ANoteonq-StirlingNumbers.................................................. 239 MirceaMerca ix

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This book, in honor of Hari M. Srivastava, discusses essential developments in mathematical research in a variety of problems. It contains thirty-five articles, written by eminent scientists from the international mathematical community, including both research and survey works. Subjects covered inc
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