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| A Few Fundamentals | |
| Introduction | p. 1 |
| The Family of Numbers | p. 4 |
| Fibonacci, Continued Fractions and the Golden Ratio | p. 7 |
| Fermat, Primes and Cyclotomy | p. 9 |
| Euler, Totients and Cryptography | p. 11 |
| Gauss, Congruences and Diffraction | p. 13 |
| Galois, Fields and Codes | p. 14 |
| The Natural Numbers | p. 19 |
| The Fundamental Theorem | p. 19 |
| The Least Common Multiple | p. 20 |
| Planetary "Gears" | p. 21 |
| The Greatest Common Divisor | p. 21 |
| Human Pitch Perception | p. 23 |
| Octaves, Temperament, Kilos and Decibels | p. 24 |
| Coprimes | p. 26 |
| Euclid's Algorithm | p. 26 |
| The Decimal System Decimated | p. 27 |
| Primes | p. 28 |
| How Many Primes are There? | p. 28 |
| The Sieve of Eratosthenes | p. 29 |
| A Chinese Theorem in Error | p. 30 |
| A Formula for Primes | p. 31 |
| Mersenne Primes | p. 32 |
| Repunits | p. 36 |
| Perfect Numbers | p. 37 |
| Fermat Primes | p. 38 |
| Gauss and the Impossible Heptagon | p. 39 |
| The Prime Distribution | p. 41 |
| A Probabilistic Argument | p. 41 |
| The Prime-Counting Function [pi](x) | p. 43 |
| David Hilbert and Large Nuclei | p. 47 |
| Coprime Probabilities | p. 48 |
| Primes in Progressions | p. 51 |
| Primeless Expanses | p. 53 |
| Squarefree and Coprime Integers | p. 54 |
| Twin Primes | p. 54 |
| Prime Triplets | p. 56 |
| Prime Quadruplets and Quintuplets | p. 57 |
| Primes at Any Distance | p. 58 |
| Spacing Distribution Between Adjacent Primes | p. 61 |
| Goldbach's Conjecture | p. 61 |
| Sum of Three Primes | p. 63 |
| Some Simple Applications | |
| Fractions: Continued, Egyptian and Farey | p. 65 |
| A Neglected Subject | p. 65 |
| Relations with Measure Theory | p. 69 |
| Periodic Continued Fractions | p. 70 |
| Electrical Networks and Squared Squares | p. 73 |
| Fibonacci Numbers and the Golden Ratio | p. 74 |
| Fibonacci, Rabbits and Computers | p. 78 |
| Fibonacci and Divisibility | p. 81 |
| Generalized Fibonacci and Lucas Numbers | p. 81 |
| Egyptian Fractions, Inheritance and Some Unsolved Problems | p. 85 |
| Farey Fractions | p. 86 |
| Farey Trees | p. 88 |
| Locked Pallas | p. 92 |
| Fibonacci and the Problem of Bank Deposits | p. 93 |
| Error-Free Computing | p. 94 |
| Congruences and the Like | |
| Linear Congruences | p. 99 |
| Residues | p. 99 |
| Some Simple Fields | p. 102 |
| Powers and Congruences | p. 103 |
| Diophantine Equations | p. 106 |
| Relation with Congruences | p. 106 |
| A Gaussian Trick | p. 107 |
| Nonlinear Diophantine Equations | p. 109 |
| Triangular Numbers | p. 110 |
| Pythagorean Numbers | p. 112 |
| Exponential Diophantine Equations | p. 113 |
| Fermat's Last "Theorem" | p. 113 |
| The Demise of a Conjecture by Euler | p. 115 |
| A Nonlinear Diophantine Equation in Physics and the Geometry of Numbers | p. 116 |
| Normal-Mode Degeneracy in Room Acoustics (A Number-Theoretic Application) | p. 120 |
| Waring's Problem | p. 121 |
| The Theorems of Fermat, Wilson and Euler | p. 122 |
| Fermat's Theorem | p. 122 |
| Wilson's Theorem | p. 123 |
| Euler's Theorem | p. 124 |
| The Impossible Star of David | p. 125 |
| Dirichlet and Linear Progression | p. 127 |
| Cryptography and Divisors | |
| Euler Trap Doors and Public-Key Encryption | p. 129 |
| A Numercal Trap Door | p. 131 |
| Digital Encryption | p. 132 |
| Public-Key Encryption | p. 133 |
| A Simple Example | p. 135 |
| Repeated Encryption | p. 136 |
| Summary and Encryption Requirements | p. 137 |
| The Divisor Functions | p. 139 |
| The Number of Divisors | p. 139 |
| The Average of the Divisor Function | p. 142 |
| The Geometric Mean of the Divisors | p. 142 |
| The Summatory Function of the Divisor Function | p. 143 |
| The Generalized Divisor Functions | p. 143 |
| The Average Value of Euler's Function | p. 144 |
| The Prime Divisor Functions | p. 146 |
| The Number of Different Prime Divisors | p. 146 |
| The Distribution of [omega](n) | p. 150 |
| The Number of Prime Divisors | p. 151 |
| The Harmonic Mean of [Omega](n) | p. 154 |
| Medians and Percentiles of [Omega](n) | p. 156 |
| Implications for Public-Key Encryption | p. 157 |
| Certified Signatures | p. 158 |
| A Story of Creative Financing | p. 158 |
| Certified Signature for Public-Key Encryption | p. 158 |
| Primitive Roots | p. 160 |
| Orders | p. 160 |
| Periods of Decimal and Binary Fractions | p. 163 |
| A Primitive Proof of Wilson's Theorem | p. 166 |
| The Index - A Number-Theoretic Logarithm | p. 166 |
| Solution of Exponential Congruences | p. 167 |
| What is the Order T[subscript m] of an Integer m Modulo a Prime p? | p. 169 |
| Index "Encryption" | p. 170 |
| A Fourier Property of Primitive Roots and Concert Hall Acoustics | p. 170 |
| More Spacious-Sounding Sound | p. 172 |
| Galois Arrays for X-Ray Astronomy | p. 174 |
| A Negative Property of the Fermat Primes | p. 175 |
| Knapsack Encryption | p. 177 |
| An Easy Knapsack | p. 177 |
| A Hard Knapsack | p. 178 |
| Residues and Diffraction | |
| Quadratic Residues | p. 181 |
| Quadratic Congruences | p. 181 |
| Euler's Criterion | p. 182 |
| The Legendre Symbol | p. 183 |
| A Fourier Property of Legendre Sequences | p. 185 |
| Gauss Sums | p. 185 |
| Pretty Diffraction | p. 187 |
| Quadratic Reciprocity | p. 187 |
| A Fourier Property of Quadratic-Residue Sequences | p. 188 |
| Spread Spectrum Communication | p. 190 |
| Generalized Legendre Sequences Obtained Through Complexification of the Euler Criterion | p. 191 |
| Chinese and Other Fast Algorithms | |
| The Chinese Remainder Theorem and Simultaneous Congruences | p. 194 |
| Simultaneous Congruences | p. 194 |
| The Sino-Representation: A Chinese Number System | p. 195 |
| Applications of the Sino-Representation | p. 196 |
| Discrete Fourier Transformation in Sino | p. 198 |
| A Sino-Optical Fourier Transformer | p. 199 |
| Generalized Sino-Representation | p. 200 |
| Fast Prime-Length Fourier Transform | p. 201 |
| Fast Transformation and Kronecker Products | p. 203 |
| A Fast Hadamard Transform | p. 203 |
| The Basic Principle of the Fast Fourier Transforms | p. 206 |
| Quadratic Congruences | p. 207 |
| Application of the Chinese Remainder Theorem (CRT) | p. 207 |
| Pseudoprimes, Mobius Transform, and Partitions | |
| Pseudoprimes, Poker and Remote Coin Tossing | p. 209 |
| Pulling Roots to Ferret Out Composites | p. 209 |
| Factors from a Square Root | p. 210 |
| Coin Tossing by Telephone | p. 212 |
| Absolute and Strong Pseudoprimes | p. 214 |
| Fermat and Strong Pseudoprimes | p. 216 |
| Deterministic Primality Testing | p. 216 |
| A Very Simple Factoring Algorithm | p. 218 |
| Factoring with Elliptic Curves | p. 218 |
| Quantum Factoring | p. 219 |
| The Mobius Function and the Mobius Transform | p. 220 |
| The Mobius Transform and Its Inverse | p. 220 |
| Proof of the Inversion Formula | p. 222 |
| Second Inversion Formula | p. 223 |
| Third Inversion Formula | p. 223 |
| Fourth Inversion Formula | p. 224 |
| Riemann's Hypothesis and the Disproof of the Mertens Conjecture | p. 224 |
| Dirichlet Series and the Mobius Function | p. 225 |
| Generating Functions and Partitions | p. 228 |
| Generating Functions | p. 228 |
| Partitions of Integers | p. 230 |
| Generating Functions of Partitions | p. 231 |
| Restricted Partitions | p. 232 |
| Cyclotomy and Polynomials | |
| Cyclotomic Polynomials | p. 236 |
| How to Divide a Circle into Equal Parts | p. 236 |
| Gauss's Great Insight | p. 239 |
| Factoring in Different Fields | p. 243 |
| Cyclotomy in the Complex Plane | p. 243 |
| How to Divide a Circle with Compass and Straightedge | p. 244 |
| Rational Factors of z[superscript N] - 1 | p. 246 |
| An Alternative Rational Factorization | p. 247 |
| Relation Between Rational Factors and Complex Roots | p. 248 |
| How to Calculate with Cyclotomic Polynomials | p. 249 |
| Linear Systems and Polynomials | p. 251 |
| Impulse Responses | p. 251 |
| Time-Discrete Systems and the z Transform | p. 252 |
| Discrete Convolution | p. 252 |
| Cyclotomic Polynomials and z Transform | p. 253 |
| Polynomial Theory | p. 254 |
| Some Basic Facts of Polynomial Life | p. 254 |
| Polynomial Residues | p. 255 |
| Chinese Remainders for Polynomials | p. 256 |
| Euclid's Algorithm for Polynomials | p. 257 |
| Galois Fields and More Applications | |
| Galois Fields | p. 260 |
| Prime Order | p. 260 |
| Prime Power Order | p. 260 |
| Generation of GF (2[superscript 4]) | p. 262 |
| How Many Primitive Elements? | p. 264 |
| Recursive Relations | p. 264 |
| How to Calculate in GF(p[superscript m]) | p. 266 |
| Zech Logarithm, Doppler Radar and Optimum Ambiguity Functions | p. 267 |
| A Unique Phase-Array Based on the Zech Logarithm | p. 270 |
| Spread-Spectrum Communication and Zech Logarithms | p. 272 |
| Spectral Properties of Galois Sequences | p. 273 |
| Circular Correlation | p. 273 |
| Application to Error-Correcting Codes and Speech Recognition | p. 275 |
| Application to Precision Measurements | p. 277 |
| Concert Hall Measurements | p. 278 |
| The Fourth Effect of General Relativity | p. 279 |
| Toward Better Concert Hall Acoustics | p. 280 |
| Higher-Dimensional Diffusors | p. 285 |
| Active Array Applications | p. 286 |
| Random Number Generators | p. 287 |
| Pseudorandom Galois Sequences | p. 288 |
| Randomness from Congruences | p. 289 |
| "Continuous" Distributions | p. 290 |
| Four Ways to Generate a Gaussian Variable | p. 291 |
| Pseudorandom Sequences in Cryptography | p. 292 |
| Waveforms and Radiation Patterns | p. 293 |
| Special Phases | p. 294 |
| The Rudin-Shapiro Polynomials | p. 296 |
| Gauss Sums and Peak Factors | p. 297 |
| Galois Sequences and the Smallest Peak Factors | p. 299 |
| Minimum Redundancy Antennas | p. 301 |
| Golomb Rulers | p. 303 |
| Number Theory, Randomness and "Art" | p. 305 |
| Number Theory and Graphic Design | p. 305 |
| The Primes of Gauss and Eisenstein | p. 307 |
| Galois Fields and Impossible Necklaces | p. 308 |
| "Baroque" Integers | p. 312 |
| Self-Similarity, Fractals and Art | |
| Self-Similarity, Fractals, Deterministic Chaos and a New State of Matter | p. 315 |
| Fibonacci, Noble Numbers and a New State of Matter | p. 318 |
| Cantor Sets, Fractals and a Musical Paradox | p. 324 |
| The Twin Dragon: A Fractal from a Complex Number System | p. 329 |
| Statistical Fractals | p. 331 |
| Some Crazy Mappings | p. 333 |
| The Logistic Parabola and Strange Attractors | p. 336 |
| Conclusion | p. 339 |
| Glossary of Symbols | p. 340 |
| References | p. 343 |
| Name Index | p. 355 |
| Subject Index | p. 359 |
| Table of Contents provided by Ingram. All Rights Reserved. |
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