arXiv:math/9912107 Abstract

arXiv:math/9912107 [math.NT]Abstract References Reviews Resources

Mean values of L-functions and symmetry

Published 1999-12-13Version 1

Recently Katz and Sarnak introduced the idea of a symmetry group attached to a family of L-functions, and they gave strong evidence that the symmetry group governs many properties of the distribution of zeros of the L-functions. We consider the mean-values of the L-functions and the mollified mean-square of the L-functions and find evidence that these are also governed by the symmetry group. We use recent work of Keating and Snaith to give a complete description of these mean values. We find a connection to the Barnes-Vign\'eras $\Gamma_2$-function and to a family of self-similar functions.

Comments: 23 pages, 6 figures

Categories: math.NT, math-ph, math.MP

Subjects: 11M06, 11F66, 81Q50

Keywords: mean values, l-functions, symmetry group governs, gave strong evidence, complete description

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