Title :
Improved geometric Goppa codes. I. Basic theory
Author :
Feng, Gui-Liang ; Rao, T.R.N.
Author_Institution :
Center for Adv. Comput. Studies, Univ. of Southwestern Louisiana, Lafayette, LA, USA
fDate :
11/1/1995 12:00:00 AM
Abstract :
In this paper, we present a construction of improved geometric Goppa codes which, for the case of r<2g, are often more efficient than the current geometric Goppa codes derived from some varieties, which include algebraic curves, hyperplanes, surfaces, and other varieties. For the special case of a plane in a three-dimensional projective space, the improved geometric Goppa codes are reduced to linear multilevel codes. For these improved geometric Goppa codes, a designed minimum distance can be easily determined and a decoding procedure which corrects up to half the designed minimum distance is also given
Keywords :
Goppa codes; algebraic geometric codes; decoding; linear codes; decoding procedure; designed minimum distance; geometric Goppa codes; improved codes; linear multilevel codes; three-dimensional projective space; Decoding; Equations; Error correction codes; Helium; Linear algebra; Linear code; Parity check codes; Reed-Solomon codes; Voting;
Journal_Title :
Information Theory, IEEE Transactions on
