Krishnan, M. Nikhil ; Shukla, Deeptanshu ; Kumar, P. Vijay (2020) Rate-Optimal Streaming Codes for Channels With Burst and Random Erasures IEEE Transactions on Information Theory, 66 (8). pp. 4869-4891. ISSN 0018-9448
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Official URL: http://doi.org/10.1109/TIT.2020.2983152
Related URL: http://dx.doi.org/10.1109/TIT.2020.2983152
Abstract
In this paper, we design erasure-correcting codes for channels with burst and random erasures, when a strict decoding delay constraint is in place. We consider the sliding-window-based packet erasure model proposed by Badr et al., where any time-window of width w contains either up to a random erasures or an erasure burst of length at most b. One needs to recover any erased packet with a strict decoding delay deadline of τ, where erasures are as per the channel model. Presently existing rate-optimal constructions in the literature require, in general, a field-size which grows exponential in τ, as long as a/τ remains a constant. In this work, we present a new rate-optimal code construction covering all channel and delay parameters, which requires an O(τ 2 ) field-size. As a special case, when (b - a) = 1, we have a field-size linear in τ. We also present two other constructions having linear fieldsize, under certain constraints on channel and decoding delay parameters. As a corollary, we obtain low field-size, rate-optimal convolutional codes for any given column distance and column span. Simulations indicate that the newly proposed streaming code constructions offer lower packet-loss probabilities compared to existing schemes, for selected instances of Gilbert-Elliott and Fritchman channels.
Item Type: | Article |
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Source: | Copyright of this article belongs to Institute of Electrical and Electronic Engineers. |
ID Code: | 124330 |
Deposited On: | 17 Nov 2021 09:41 |
Last Modified: | 17 Nov 2021 09:41 |
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