Paper Info
Title
Five families of the narrow-sense primitive BCH codes over finite fields
Abstract
It is an interesting problem to determine the parameters of BCH codes, due to their wide applications. In this paper, we determine the dimension and the Bose distance of five families of the narrow-sense primitive BCH codes with the following designed distances: 1. delta((a,b)) = aq(m)-1/q-1 + bq(m)-1/q2-1, where is even, 0 <= a <= q - 1, 1 <= b <= q - 1, 1 <= a + b <= q - 1 (2). (delta) over tilde ((a,b)) = aq(m-1) + (a + b)q(m-2) - 1, where is even, 0 <= a <= q-1, 1 <= b <= q-1, 1 <= a+b <= q-1. 3. delta((a,c)) = aq(m)-1/q-1 + cq(m-1)-1/q-1, where m >= 2, 0 <= a <= q-1, 1 <= c <= q-1, 1 <= a + c <= q-1. 4. delta((a,t))'=aq(m)-1/q-1 + q(m-1)-1/q-1-t, where m >= 3, 0 <= a <= q-2, a + 2 <= t <= q-1. 5. delta((a,c,t))''=aq(m)-1/q-1 + cq(m-1)-1/q-1-t, where m >= 3, 0 <= a <= q-3, 2 <= c <= q-, 1 <= a+c <= q-1, 1 <= t <= c-1. Moreover, we obtain the exact parameters of two subfamilies of BCH codes with designed distances (delta) over bar = bq(m)-1/q(2)-1 and delta(a,t)=(at+1)qm-1t(q-1) with even m, 1 <= a <= [q-2/t], 1 <= b <= q - 1, t>1 and t vertical bar(q +1). Note that we get the narrow-sense primitive BCH codes with flexible designed distance as to a, b, c, t. Finally, we obtain a lot of the optimal or the best narrow-sense primitive BCH codes.
Year
DOI
Venue
2021
10.1007/s10623-021-00942-z
DESIGNS CODES AND CRYPTOGRAPHY
Keywords
DocType
Volume
Narrow-sense primitive BCH code, Bose distance, Cyclotomic coset
Journal
89
Issue
ISSN
Citations 
12
0925-1022
0
PageRank 
References 
Authors
0.34
0
3
Name
Order
Citations
PageRank
Binbin Pang131.75
Shixin Zhu221637.61
Xiaoshan Kai3839.90