R. Blackburn, Simon and F. McKee, James (2011) Constructing k-radius sequences. Mathematics of Computation
Full text access: Open
An n-ary k-radius sequence is a finite sequence of elements taken from an alphabet of size n such that any two distinct elements of the alphabet occur within distance k of each other somewhere in the sequence. These sequences were introduced by Jaromczyk and Lonc to model a caching strategy for computing certain functions on large data sets such as medical images. Let f_k(n) be the shortest length of any k-radius sequence. We improve on earlier estimates for f_k(n) by using tilings and logarithms. The main result is that f_k(n) ~ n^2/(2k) as n tends to infinity whenever a certain tiling of Z^r exists. In particular this result holds for infinitely many k, including all k
This is a Submitted version This version's date is: 2/8/2011 This item is not peer reviewed
https://repository.royalholloway.ac.uk/items/9fea9fb2-8a44-7c30-4131-c45e9ac88134/4/
Deposited by Research Information System (atira) on 24-Jul-2012 in Royal Holloway Research Online.Last modified on 24-Jul-2012
21 pages, 1 figure. Improved error term in the main theorem for infinitely many k. Revised Open Problems, with some heuristic discussion