NATURAL BOUNDARIES AND A CORRECT NOTION OF INTEGRAL MOMENTS OF L–FUNCTIONS Adrian Diaconu, Paul Garrett and Dorian Goldfeld Abstract. It is shown that a large class of multiple Dirichlet series which arise naturally in

First Page		Document Content
Date: 2009-09-23 15:32:05 Analytic number theory Special functions Gamma function Residue Riemann zeta function Algebraic number field Spectral theory Symbol Polylogarithm Mathematical analysis Mathematics Meromorphic functions		NATURAL BOUNDARIES AND A CORRECT NOTION OF INTEGRAL MOMENTS OF L–FUNCTIONS Adrian Diaconu, Paul Garrett and Dorian Goldfeld Abstract. It is shown that a large class of multiple Dirichlet series which arise naturally in Add to Reading List Source URL: www.math.umn.edu Download Document from Source Website File Size: 280,68 KB Share Document on Facebook

	Algebraic techniques for number field computations (extended abstract) Jean-Fran¸cois Biasse1 , Michael J. Jacobson, Jr.2? , and Alan K. Silvester3 ´ Ecole Polytechnique, 91128 Palaiseau, France DocID: 1xVMw - View Document
	CLASS FIELD THEORY P. Stevenhagen Explicit Algebraic Number Theory Oberwolfach Seminar November 2002 DocID: 1voYb - View Document
	MATH 205 (TOPICS IN ALGEBRAIC NUMBER THEORY) - SPRINGProfessor: Cristian D. Popescu Course Topic: Global Fields Course Description: The main goal of this course is to understand global fields (finite field extensi DocID: 1uKaO - View Document
	The Id`ele Class Group Hendrik Lenstra 1. Definitions Let K be an algebraic number field. Let p be a prime of K. We denote by Kp the completion of K at the prime p: if p is a finite place, then Kp is a non-archimedean DocID: 1uugJ - View Document
	APPEARED IN BULLETIN OF THE AMERICAN MATHEMATICAL SOCIETY Volume 31, Number 1, July 1994, Pages 1-14 SELBERG’S CONJECTURES AND ARTIN L-FUNCTIONS DocID: 1rsPV - View Document