Analytic Number Theory:The Halberstam Festschrift 2Bruce C. Berndt, Harold Diamond, Adolf J Hildebrand The second of two volumes presenting papers from an international conference on analytic number theory. The two volumes contain 50 papers, with an emphasis on topics such as sieves, related combinatorial aspects, multiplicative number theory, additive number theory, and Riemann zeta-function. |
Contents
V | 451 |
VI | 465 |
VII | 471 |
VIII | 487 |
IX | 517 |
X | 537 |
XI | 559 |
XII | 567 |
XIX | 685 |
XX | 703 |
XXI | 713 |
XXII | 723 |
XXIII | 737 |
XXIV | 745 |
XXV | 755 |
XXVI | 767 |
Common terms and phrases
additive function analytic apply argument assume asymptotic automorphic representations coefficients conjecture constant coprime Corollary cusp forms defined denote the number Dirichlet series divisor function elliptic curve error term estimate exponential sums factor finite fixed follows formula Fourier genus Heini Halberstam Hence holds holomorphic hypothesis implies inequality interval irreducible Kloosterman sums L-functions Lemma log log lower bound Math Mathematics method modular multiplicative n-irr non-zero notation number field number of solutions Number Theory obtain P₁ polynomial positive integer prime ideal prime number prime number theorem Proof of Theorem Proposition prove quadratic rational real number result Riemann Riemann hypothesis satisfies semigroup sequence sieve spectral sufficiently large supersingular primes Suppose Ty(x uniformly Univ upper bound variables zero zeta function zeta-function ΣΣ