Add to ORKGWe present quasi-linear time systematic encoding algorithms for multiplicity codes. The algorithms have their origins in the fast multivariate interpolation and evaluation algorithms of van der Hoeven and Schost (2013), which we generalise to address certain Hermite-type interpolation and evaluation problems. By providing fast encoding algorithms for multiplicity codes, we remove an obstruction on the road to the practical application of the private information retrieval protocol of Augot, Levy-dit-Vehel and Shikfa (2014)
International audienceSince the concept of locally decodable codes was introduced by Katz and Trevis...
International audienceWe modify the Euclidean algorithm of Feng and Tzeng to decode Reed-Solomon (RS...
International audienceIn this paper we design a decoding algorithm based on a lifting decoding schem...
We present quasi-linear time systematic encoding algorithms for multiplicity codes. The algorithms h...
International audienceWe here provide a method for systematic encoding of the Multiplicity codes int...
International audienceThe key step of syndrome-based decoding of Reed--Solomon codes up to half the ...
Assuming that we have a soft-decision list decoding algorithm of a linear code, a new hard-decision...
Locally decodable codes are error-correcting codes that admit efficient decoding algorithms; any bit...
Multivalued encodings constitute an interesting generalization of ordinary encodings in that they al...
AbstractMultivalued encodings constitute an interesting generalization of ordinary encodings in that...
International audienceThe interpolation step in the Guruswami-Sudan algorithm is a bivariateinterpol...
Presented on October 1, 2018 at 11:00 a.m. in the Pettit Microelectronics Research Center, Room 102 ...
Reed-Muller codes are among the most important classes of locally correctable codes. Currently local...
International audienceSince the concept of locally decodable codes was introduced by Katz and Trevis...
International audienceWe modify the Euclidean algorithm of Feng and Tzeng to decode Reed-Solomon (RS...
International audienceIn this paper we design a decoding algorithm based on a lifting decoding schem...
We present quasi-linear time systematic encoding algorithms for multiplicity codes. The algorithms h...
International audienceWe here provide a method for systematic encoding of the Multiplicity codes int...
International audienceThe key step of syndrome-based decoding of Reed--Solomon codes up to half the ...
Assuming that we have a soft-decision list decoding algorithm of a linear code, a new hard-decision...
Locally decodable codes are error-correcting codes that admit efficient decoding algorithms; any bit...
Multivalued encodings constitute an interesting generalization of ordinary encodings in that they al...
AbstractMultivalued encodings constitute an interesting generalization of ordinary encodings in that...
International audienceThe interpolation step in the Guruswami-Sudan algorithm is a bivariateinterpol...
Presented on October 1, 2018 at 11:00 a.m. in the Pettit Microelectronics Research Center, Room 102 ...
Reed-Muller codes are among the most important classes of locally correctable codes. Currently local...
International audienceSince the concept of locally decodable codes was introduced by Katz and Trevis...
International audienceWe modify the Euclidean algorithm of Feng and Tzeng to decode Reed-Solomon (RS...
International audienceIn this paper we design a decoding algorithm based on a lifting decoding schem...