|
|||||
 |
|
|
|
|
|
|
|
Arithmetic functions in
short intervals and the symmetric group
Brad Rodgers |
|
Vol. 12 (2018), No. 5, 1243–1279
|
Abstract |
|
We consider the variance of sums of arithmetic functions over random short intervals in the function field setting. Based on the analogy between factorizations of random elements of into primes and the factorizations of random permutations into cycles, we give a simple but general formula for these variances in the large limit for arithmetic functions that depend only upon factorization structure. From this we derive new estimates, quickly recover some that are already known, and make new conjectures in the setting of the integers. In particular we make the combinatorial observation that any function of this sort can be explicitly decomposed into a sum of functions and , depending on the size of the short interval, with making a negligible contribution to the variance, and asymptotically contributing diagonal terms only. This variance evaluation is closely related to the appearance of random matrix statistics in the zeros of families of -functions and sheds light on the arithmetic meaning of this phenomenon. |
PDF Access Denied
We have not been able to recognize your IP address
3.226.122.122
as that of a subscriber to this journal.
Online access to the content of recent issues is by
subscription, or purchase of single articles.
Please contact your institution's librarian suggesting a subscription, for example by using our journal-recommendation form. Or, visit our subscription page for instructions on purchasing a subscription.
You may also contact us at
contact@msp.org
or by using our
contact form.
Or, you may purchase this single article for USD 40.00:
Keywords
arithmetic in function fields, random matrices, the
symmetric group
|
Mathematical Subject Classification 2010
Primary: 11M50
Secondary: 11N37, 11T55
|
Milestones
Received: 30 September 2017
Revised: 29 January 2018
Accepted: 18 March 2018
Published: 31 July 2018
|
Authors |
| Brad Rodgers | |
| Department of Mathematics University of Michigan Ann Arbor, MI United States |
|
