with applications in cryptography, physics, digital information, computing, and self-similarity Schroeder, M. R. creator Berlin New York Springer-Verlag c1986 2nd enl. ed. xix, 374 p. : ill. ; 24 cm. Part i: A Few Fundamental, Introduction (Page-1), The Natural Numbers (Page-17), Primes (Page-26), The Prime Distribution (Page-40), Part ii: Some Simple Applications, Fraction: Continued, Egyptian and Farey (Page-55), Part iii: Congruence’s and the like , Linear Congruence’s (Page-87), Diophantine Equations (Page-95), The Theorems of Fermat , Wilson and Euler (Page-111), Part iv: Cryptography and Divisors , Euler trap Doors and Publics and Public-Key Encryption (Page-118), The Divisor Functions (Page-127), The Prime Divisor Functions (Page-135), Certified Signatures (Page-149), Primitive Roots (Page-151), Knapsack Encryption (Page-168), Part V: Residues and Diffraction , Quadratic Residues (Page-172), Part VI: Chinese and Other Fast Algorithms, The Chinese Remainder Theorem and Simultaneous Congruence’s (Page-186), Fast Transformation and Kronecker Products (Page-196), Quadratic Congruence’s (Page-201), Part vii: Pseudo primes, Mobius Transform, and Partitions , Pseudo primes, Poker and Remote Coin Tossing (Page-203), The Mobius Function and the Mobius Transform (Page-215), Generating Functions and Partitions (Page-223), Part viii: Cyclostomes and Polynomials , Cyclotomic Polynomials (Page-232), Linear Systems and Polynomials (Page-249), Polynomial Theory (Page-253), Part ix : Galois Fields and More Application , Galois Fields (Page-259), Spectral Properties of Galois Sequences(Page-274), Random Number Generations (Page-289), Waveforms and Radiation Patterns (Page-297) Number Theory, Randomness and Art (Page-307), Part x: Self-Similarity, Fractals and Art , Self-similarity , Fractals, Deterministic Chaos and New Sate Of Matter (Page-315), Appendix (Page-341). M.R. Schroeder. Number theory 512.7,SCH 0387158006 (U.S. : pbk.) 85017260 20221117123414.0