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New bounds and optimal binary signature sets—Part I: Periodic total squared correlation

Ganapathy, H, Pados, D.A, Karystinos Georgios

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URI: http://purl.tuc.gr/dl/dias/E42C6777-9660-4ADA-81FB-0DEEAE7FCAED
Year 2011
Type of Item Peer-Reviewed Journal Publication
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Bibliographic Citation H. Ganapathy, D. A. Pados, and G. N. Karystinos, “New bounds and optimal binary signature sets-Part I: Periodic total squared correlation,” IEEE Transactions on Communications, vol. 59,no. 4, pp. 1123 - 1132, Apr. 2011. doi: 10.1109/TCOMM.2011.020411.090404 https://doi.org/10.1109/TCOMM.2011.020411.090404
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Summary

We derive new bounds on the periodic (cyclic) total squared correlation (PTSC) of binary antipodal signature sets for any number of signatures K and any signature length L. Optimal designs that achieve the new bounds are then developed for several (K,L) cases. As an example, it is seen that complete (K = L + 2) Gold sets are PTSC optimal, but not, necessarily, Gold subsets of K <; L + 2 signatures. In contrast, arguably against common expectation, the widely used Kasami sets are not PTSC optimal in general. The optimal sets provided herein are in this sense better suited for asynchronous and/or multipath code-division multiplexing applications.

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