Construction XX with a Chain of De Boer–Brouwer Codes
Given three linear [s, ni, di]-codes C1 ⊆ C2 ⊆ C3 and two additional codes C4, C5 with parameters [s4, n3 – n1, d4] and [s5, n3 – n2, d5], all over the same field, a new [s + s4 + s5, n3, d]-code with
can be constructed.
This construction is a special case of construction XX, which requires only C1 ⊆ C3 instead of C1 ⊆ C2.
Special Cases
If C1 = C2, this construction yields the same result as construction X applied to C1 ⊆ C3 with the extension code obtained from applying juxtaposition to C4 and C5.
If C2 = C3, this construction yields the same result as construction X applied to C1 ⊆ C2 with extension code C5 and increasing the length of the code by s5 using embedding.
Applications
MinT applies this method in all situations where construction X is applied and chains containing at least 3 subcodes are available.
Reed-Solomon-codes RS(n1, b) ⊂ RS(n2, b) ⊂ RS(n3, b) with n1 < n2 < n3 (not used)
Algebraic-geometric codes AG(F, n1) ⊂ AG(F, n2) ⊂ AG(F, n3) with n1 < n2 < n3
Cyclic codes C(A1) ⊂ C(A2) ⊂ C(A3) with A3ʹ ⊂ A2ʹ ⊂ A1ʹ
Extended cyclic codes Ce(k1) ⊂ Ce(k2) ⊂ Ce(k3) with k1 > k2 > k3
Sequences Cr and Dr by de Boer and Brouwer (not used)
Copyright
Copyright © 2004, 2005, 2006, 2007, 2008, 2009, 2010 by Rudolf Schürer and Wolfgang Ch. Schmid.
Cite this as: Rudolf Schürer and Wolfgang Ch. Schmid. “Construction XX with a Chain of De Boer–Brouwer Codes.”
From MinT—the database of optimal net, code, OA, and OOA parameters.
Version: 2024-09-05.
http://mint.sbg.ac.at/desc_CConsXX3-BoerBrouwer.html