Table of Contents

• History of finite fields : Finite fields in the 18-th and 19-th centuriesRoderick Gow. 3-12
• Introduction to finite fields : Basic properties of finite fieldsGary L. Mullen, Daniel Panario. 13-31
• TablesDavid Thomson. 32-52
• Counting irreducible polynomialsJoseph L. Yucas. 53-59
• Construction of irreducibleMelsik K. Kyuregyan. 60-65
• Conditions for reducible polynomialsDaniel Panario. 66-69
• Weights of irreducible polynomialsOmran Ahmadi. 70-72
• Prescribed coefficientsStephen D. Cohen. 73-78
• Multivariate polynomialsXiang-dong Hou. 79-86
• Introduction to primitive polynomialsGary L. Mullen, Daniel Panario. 87-89
• Prescribed coefficientsStephen D. Cohen. 90-94
• Weights of primitive polynomialsStephen D. Cohen. 95-97
• Elements of high orderJosé Felipe Voloch. 98-100
• Duality theory of basesDieter Jungnickel. 101-108
• Normal basesShuhong Gao, Qunying Liao. 109-116
• Complexity of normal basesShuhong Gao, David Thomson. 117-127
• Completely normal basesDirk Hachenberger. 128-138
• Gauss, Jacobi, and Kloosterman sumsRonald J. Evans. 139-160
• More general exponential and character sumsAntonio Rojas-León. 161-169
• Some applications of character sumsAlina Ostafe, Arne Winterhof. 170-184
• Sum-product theorems and applicationsMoubariz Z. Garaev. 185-192
• General formsDaqing Wan. 193-200
• Quadratic formsRobert Fitzgerald. 201-205
• Diagonal equationsFrancis N. Castro, Ivelisse Rubio. 206-214
• One variableGary L. Mullen, Qiang Wang 0012. 215-229
• Several variablesRudolf Lidl, Gary L. Mullen. 230-231
• Value sets of polynomialsGary L. Mullen, Michael E. Zieve. 232-235
• Exceptional polynomialsMichael E. Zieve. 236-240
• Boolean functionsClaude Carlet. 241-252
• PN and APN functionsPascale Charpin. 253-261
• Bent and related functionsAlexander Kholosha, Alexander Pott. 262-272
• k-polynomials and related algebraic objectsRobert Coulter. 273-277
• Planar functions and commutative semifieldsRobert Coulter. 278-281
• Dickson polynomialsQiang Wang 0012, Joseph L. Yucas. 282-289
• Schur?s conjecture and exceptional coversMichael D. Fried. 290-302
• Finite field transformsGary McGuire. 303-310
• LFSR sequences and maximal period sequencesHarald Niederreiter. 311-316
• Correlation and autocorrelation of sequencesTor Helleseth. 317-323
• Linear complexity of sequences and multisequencesWilfried Meidl, Arne Winterhof. 324-336
• Algebraic dynamical systems over finite fieldsIgor E. Shparlinski. 337-344
• Computational techniquesChristophe Doche. 345-363
• Univariate polynomial counting and algorithmsDaniel Panario. 364-373
• Algorithms for irreducibility testing and for constructing irreducible polynomialsMark Giesbrecht. 374-379
• Factorization of univariate polynomialsJoachim von zur Gathen. 380-381
• Factorization of multivariate polynomialsErich Kaltofen, Grégoire Lecerf. 382-392
• Discrete logarithms over finite fieldsAndrew M. Odlyzko. 393-400
• Standard models for finite fieldsBart de Smit, Hendrik Lenstra. 401-404
• Introduction to function fields and curvesArnaldo Garcia, Henning Stichtenoth. 405-421
• Elliptic curvesJoseph H. Silverman. 422-439
• Addition formulas for elliptic curvesDaniel J. Bernstein, Tanja Lange 0001. 440-446
• Hyperelliptic curvesMichael J. Jacobson Jr., Renate Scheidler. 447-455
• Rational points on curvesArnaldo Garcia, Henning Stichtenoth. 456-463
• TowersArnaldo Garcia, Henning Stichtenoth. 464-468
• Zeta functions and L-functionsLei Fu. 469-478
• p-adic estimates of zeta functions and L-functionsRégis Blache. 479-487
• Computing the number of rational points and zeta functionsDaqing Wan. 488-492
• Relations between integers and polynomials over finite fieldsGove Effinger. 493-499
• Matrices over finite fieldsDieter Jungnickel. 500-509
• Classical groups over finite fieldsZhe-xian Wan. 510-519
• Computational linear algebra over finite fieldsJean-Guillaume Dumas, Clément Pernet. 520-534
• Carlitz and Drinfeld modulesDavid Goss. 535-548
• Latin squaresGary L. Mullen. 550-555
• Lacunary polynomials over finite fieldsSimeon Ball, Aart Blokhuis. 556-562
• Affine and projective planesGary L. Ebert, Leo Storme. 563-573
• Projective spacesJames W. P. Hirschfeld, Joseph A. Thas. 574-588
• Block designsCharles J. Colbourn, Jeffrey H. Dinitz. 589-598
• Difference setsAlexander Pott. 599-606
• Other combinatorial structuresJeffrey H. Dinitz, Charles J. Colbourn. 607-618
• (t, m, s)-nets and (t, s)-sequencesHarald Niederreiter. 619-629
• Applications and weights of multiples of primitive and other polynomialsBrett Stevens. 630-641
• Ramanujan and expander graphsM. Ram Murty, Sebastian M. Cioaba. 642-658
• Basic coding properties and boundsIan F. Blake, W. Cary Huffman. 659-702
• Algebraic-geometry codesHarald Niederreiter. 703-712
• LDPC and Gallager codes over finite fieldsIan F. Blake, W. Cary Huffman. 713-726
• Raptor codesIan F. Blake, W. Cary Huffman. 727-740
• Turbo codes over finite fieldsOscar Y. Takeshita. 727-734
• Introduction to cryptographyAlfred Menezes. 741-749
• Polar codesSimon Litsyn. 741-740
• Stream and block ciphersGuang Gong, Kishan Chand Gupta. 750-763
• Multivariate cryptographic systemsJintai Ding. 764-783
• Elliptic curve cryptographic systemsAndreas Enge. 784-796
• Hyperelliptic curve cryptographic systemsNicolas Thériault. 797-803
• Cryptosystems arising from Abelian varietiesKumar Murty. 803-810
• Binary extension field arithmetic for hardware implementationsM. Anwarul Hasan, Haining Fan. 811-824
• Finite fields in biologyFranziska Hinkelmann, Reinhard C. Laubenbacher. 825-834
• Finite fields in quantum information theoryMartin Roetteler, Arne Winterhof. 834-840
• Finite fields in engineeringJonathan Jedwab, Kai-Uwe Schmidt. 841-850