Number Theory: Proceedings of the First Conference of the Canadian Number Theory Association Held at the Banff Center, Banff, Alberta, April 17-27, 1988Richard A. Mollin These proceedings contain 45 refereed papers in diverse areas of number theory including algebraic, analytic, elementary and computational number theory; elliptic curves; connections with logic; and complexity of algorithms. For computer scientists as well as number theorists and research mathematicians in general. Annotation copyrighted by Book News, Inc., Portland, OR |
Contents
Preface | 1 |
W Boyd and H L Montgomery | 7 |
W Boyd and W Parry | 27 |
Complexity of Algorithms in Algebraic Number | 37 |
J R Burke and W A Webb | 55 |
P J Cameron and P Erdös | 61 |
Cohen | 81 |
F R DeMeyer and G R Greenfield | 93 |
xii | 177 |
R K | 193 |
R Hayes | 207 |
A Hildebrand | 227 |
E Jacobson | 249 |
Jutila | 271 |
G Kientega and P Barrucand | 287 |
A J Lazarus | 313 |
H G Diamond H Halberstam and H E Richert | 99 |
A G Earnest | 115 |
P Erdös and A Sárközy | 125 |
J Fabrykowski and M V Subbarao | 139 |
R W Forcade and A D Pollington | 147 |
Goldfeld | 157 |
Lipschitz and A J van der Poorten | 339 |
J Martinet | 359 |
Matijasevich | 387 |
E Mays | 401 |
R A Mollin and H C Williams | 417 |
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Common terms and phrases
a₁ additive functions algebraic number field algorithm asymptotic b₁ basis C₂ Canada class number CNTA coefficients complete compute congruence conjecture constant Corollary cyclotomic defined denote density digit sum diophantine equation discriminant distribution divides divisor element elliptic curve equivalent Erdös estimate example exists Fermat Fermat's Last Theorem finite formula fractions function f functional equation g-adic integer given Harshad Hence homomorphism implies inequality infinite irreducible isomorphism k₁ K₂ Lemma linear log log logarithm lower bound Math Mathematics mediants modulo Mollin multiplicative Number Theory obtain P=1 mod P₁ paper partition polynomial positive integer power series prime ideals problem Proc proof of Theorem Proposition prove quadratic form R-D type rational real quadratic fields repunit result Riemann Riemann hypothesis S₁ satisfying sequence solutions subset triangle values variables zero