Title :
Transform-Based Computation of the Distribution of a Linear Combination of Random Variables Over Arbitrary Finite Fields
Author :
Moon, Todd K. ; Gunther, Jacob H.
Author_Institution :
Elec trical & Comput. Eng. Dept., Utah State Univ., Logan, UT, USA
Abstract :
Several authors have developed a Hadamard (variously called FFT) transform technique for fast belief propagation over GF(q), where in all prior work q=2m for some m. The belief propagation step which employs the transform generalizes Gallager´s lemma for computing the distribution of a sum of variables over a finite field. In this paper, the limitation to fields of characteristic 2 is eliminated, so that computations can take place over finite fields of arbitrary prime characteristic. This opens the door, for example, for BP decoding algorithms over the same fields that are used for algebraic geometry codes.
Keywords :
Galois fields; Hadamard transforms; algebraic geometric codes; BP decoding algorithms; Gallager´s lemma; Hadamard transform; algebraic geometry codes; arbitrary finite fields; arbitrary prime characteristic; belief propagation; random variables; Belief propagation; Convolution; Decoding; Discrete Fourier transforms; Parity check codes; Probability distribution; Random variables; Please add index terms;
Journal_Title :
Signal Processing Letters, IEEE
DOI :
10.1109/LSP.2011.2172792
