Title :
Bounds for complexity of syndrome decoding for poset metrics
Author :
Firer, Marcelo ; Anderson Pinheiro, Jerry
Author_Institution :
Inst. of Math., Stat. & Sci. Comput., Univ. of Campinas, Campinas, Brazil
fDate :
April 26 2015-May 1 2015
Abstract :
In this work we show how to decompose a linear code relatively to any given poset metric. We prove that the complexity of syndrome decoding is determined by a maximal (primary) such decomposition and then show that a refinement of a partial order leads to a refinement of the primary decomposition. Using this and considering already known results about hierarchical posets, we can establish upper and lower bounds for the complexity of syndrome decoding relatively to a poset metric.
Keywords :
computational complexity; linear codes; set theory; linear code; poset metrics; primary decomposition; syndrome decoding complexity; Complexity theory; Decoding; Hamming weight; Linear codes; Measurement;
Conference_Titel :
Information Theory Workshop (ITW), 2015 IEEE
Conference_Location :
Jerusalem
Print_ISBN :
978-1-4799-5524-4
DOI :
10.1109/ITW.2015.7133130
