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1 | (24) |
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1.1 Definitions: Introduction from History |
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1 | (5) |
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1.2 Sums of Consecutive Powers of Integers and Theorem of Faulhaber |
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6 | (7) |
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13 | (7) |
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1.4 The Generating Function of Bernoulli Numbers |
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20 | (5) |
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2 Stirling Numbers and Bernoulli Numbers |
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25 | (16) |
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25 | (9) |
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2.2 Formulas for the Bernoulli Numbers Involving the Stirling Numbers |
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34 | (7) |
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3 Theorem of Clausen and von Staudt, and Kummer's Congruence |
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41 | (10) |
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3.1 Theorem of Clausen and von Staudt |
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41 | (2) |
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43 | (3) |
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3.3 Short Biographies of Clausen, von Staudt and Kummer |
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46 | (5) |
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4 Generalized Bernoulli Numbers |
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51 | (14) |
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51 | (2) |
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4.2 Generalized Bernoulli Numbers |
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53 | (2) |
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4.3 Bernoulli Polynomials |
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55 | (10) |
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5 The Euler--Maclaurin Summation Formula and the Riemann Zeta Function |
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65 | (10) |
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5.1 Euler--Maclaurin Summation Formula |
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65 | (2) |
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5.2 The Riemann Zeta Function |
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67 | (8) |
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6 Quadratic Forms and Ideal Theory of Quadratic Fields |
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75 | (20) |
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75 | (2) |
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6.2 Orders of Quadratic Fields |
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77 | (10) |
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6.3 Class Number Formula of Quadratic Forms |
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87 | (8) |
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7 Congruence Between Bernoulli Numbers and Class Numbers of Imaginary Quadratic Fields |
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95 | (8) |
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7.1 Congruence Between Bernoulli Numbers and Class Numbers |
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95 | (2) |
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7.2 “r;Hurwitz-integral”r; Series |
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97 | (2) |
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99 | (4) |
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8 Character Sums and Bernoulli Numbers |
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103 | (36) |
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104 | (3) |
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107 | (3) |
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8.3 Exponential Sums and Generalized Bernoulli Numbers |
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110 | (8) |
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8.4 Various Examples of Sums |
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118 | (3) |
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8.5 Sporadic Examples: Using Functions |
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121 | (1) |
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8.6 Sporadic Examples: Using the Symmetry |
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122 | (5) |
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8.7 Sporadic Example: Symmetrize Asymmetry |
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127 | (5) |
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8.8 Quadratic Polynomials and Character Sums |
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132 | (1) |
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8.9 A Sum with Quadratic Conditions |
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133 | (6) |
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9 Special Values and Complex Integral Representation of L-Functions |
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139 | (16) |
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9.1 The Hurwitz Zeta Function |
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139 | (2) |
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141 | (4) |
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9.3 The Functional Equation of ξ(s, a) |
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145 | (3) |
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9.4 Special Values of L-Functions and the Functional Equations |
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148 | (7) |
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10 Class Number Formula and an Easy Zeta Function of the Space of Quadratic Forms |
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155 | (28) |
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10.1 Ideal Class Groups of Quadratic Fields |
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155 | (7) |
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10.2 Proof of the Class Number Formula of Imaginary Quadratic Fields |
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162 | (11) |
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10.3 Some L-Functions Associated with Quadratic Forms |
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173 | (10) |
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11 p-adic Measure and Kummer's Congruence |
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183 | (20) |
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11.1 Measure on the Ring of p-adic Integers and the Ring of Formal Power Series |
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183 | (13) |
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196 | (2) |
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11.3 Kummer's Congruence Revisited |
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198 | (5) |
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203 | (6) |
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203 | (4) |
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12.2 A Short Biography of Hurwitz |
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207 | (2) |
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13 The Barnes Multiple Zeta Function |
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209 | (14) |
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13.1 Special Values of Multiple Zeta Functions and Bernoulli Polynomials |
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210 | (2) |
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13.2 The Double Zeta Functions and Dirichlet Series |
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212 | (6) |
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13.3 ξ(s, α) and Continued Fractions |
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218 | (5) |
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14 Poly-Bernoulli Numbers |
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223 | (16) |
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14.1 Poly-Bernoulli Numbers |
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223 | (4) |
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14.2 Theorem of Clausen and von Staudt Type |
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227 | (6) |
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14.3 Poly-Bernoulli Numbers with Negative Upper Indices |
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233 | (6) |
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Appendix (by Don Zagier): Curious and Exotic Identities for Bernoulli Numbers |
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239 | (24) |
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A.1 The “r;Other”r; Generating Function(s) for the Bernoulli Numbers |
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240 | (4) |
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A.2 An Application: Periodicity of Modified Bernoulli Numbers |
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244 | (2) |
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246 | (3) |
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A.4 Products and Scalar Products of Bernoulli Polynomials |
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249 | (7) |
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A.5 Continued Fraction Expansions for Generating Functions of Bernoulli Numbers |
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256 | (7) |
| References |
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263 | (6) |
| Index |
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269 | |
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