Litcius/Paper detail

Generic Decoding in the Sum-Rank Metric

Sven Puchinger, Julian Renner, Johan Rosenkilde

2022IEEE Transactions on Information Theory21 citationsDOIOpen Access PDF

Abstract

We propose the first non-trivial generic decoding algorithm for codes in the sum-rank metric. The new method combines ideas of well-known generic decoders in the Hamming and rank metric. For the same code parameters and number of errors, the new generic decoder has a larger expected complexity than the known generic decoders for the Hamming metric and smaller than the known rank-metric decoders. Furthermore, we give a formal hardness reduction, providing evidence that generic sum-rank decoding is computationally hard. As a by-product of the above, we solve some fundamental coding problems in the sum-rank metric: we give an algorithm to compute the exact size of a sphere of a given sum-rank radius, and also give an upper bound as a closed formula; and we study erasure decoding with respect to two different notions of support.

Topics & Concepts

Decoding methodsMetric (unit)Rank (graph theory)List decodingHamming boundMathematicsHamming distanceHamming codeSequential decodingUpper and lower boundsDiscrete mathematicsAlgorithmBlock codeCombinatoricsConcatenated error correction codeOperations managementEconomicsMathematical analysisCoding theory and cryptographygraph theory and CDMA systemsCooperative Communication and Network Coding