Apr 18, 2017 · Abstract: Splitter sets are closely related to lattice tilings, and have applications in flash memories and conflict-avoiding codes.
The construction of the splitter sets and k-radius sequences are closely related and so are both studied in this paper. A. Flash Memories and Splitter Sets.
In this paper, we obtain several new results contributing to splitter sets and k-radius sequences. We give some new constructions of perfect splitter sets, as ...
Splitter sets are closely related to lattice tilings, and have applications in flash memories and conflict-avoiding codes. The study of k-radius sequences ...
Mar 9, 2020 · An n -ary k -radius sequence is a finite sequence of elements taken from an alphabet of size n in which any two distinct elements occur ...
May 21, 2019 · Abstract—Splitter sets have been widely studied due to their applications in flash memories, and their close relations with.
In this paper we present an explicit construction of “short” k -radius sequences for some values of k and n.
A general lower bound on the maximum size of nonsingularsplitter sets is given and four new constructions of quasi-perfect splitter sets are presented.
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 ...
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Splitter sets are closely related to lattice tilings, and have applications in flash memories, conflict avoiding codes and k-radius sequences. In this talk ...