Design of error detection scheme for class C service in ATM
IEEE/ACM Transactions on Networking (TON)
Fundamentals of telecommunication networks
Fundamentals of telecommunication networks
Performance of ATM networks under hybrid ARQ/FEC error control scheme
IEEE/ACM Transactions on Networking (TON)
VLSI architecture of modified Euclidean algorithm for Reed-Solomon code
Information Sciences: an International Journal
A cell loss recovery method using FEC in ATM networks
IEEE Journal on Selected Areas in Communications
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Product codes are powerful codes that can be used to correct errors or recover erasures. The simplest form of a product code is that where every row and every column is terminated by a single parity bit referred to as single parity check (SPC) product code. This code has a minimum distance of four and is thus guaranteed to recover all single, double, and triple erasure patterns. Judging the code performance based on its minimum distance is very pessimistic because the code is actually capable of recovering many higher erasure patterns. Kousa [IEEE Trans. Commun. 50 (Jan) (2002) 7] develops a novel approach for deriving an upper bound on the post-decoding erasure rate for the SPC product code with iterative decoding. We derive a formula for finding the number of unrecoverable basic pattern and the number of recoverable pattern generated from the unrecoverable basic pattern. The results are compared with that of Kousa [IEEE Trans. Commun. 50 (Jan) (2002) 7].