论文信息 - Mersenne numbers rooted on 3 for number theoretic transforms

Mersenne numbers rooted on 3 for number theoretic transforms

Number Theoretic Transforms (NTT) have been shown capable of implementing efficiently finite digital convolutions for signal processing applications in voice, video, and pattern recognition areas. In this paper the concept of Generalized Mersenne Numbers (GMN) is introduced with the goal of obtaining a new discrete transform having certain desirable properties. In particular we analyze Mersenne numbers rooted on 3, having the form m = 3t-2. Properties and necessary conditions of the GMN are investigated. Several structural characteristics are established.

Daniel Minoli | Wendell Nakamine

[1] C. Burrus,et al. Number theoretic transforms to implement fast digital convolution , 1975 .

[2] Charles M. Rader,et al. Discrete Convolutions via Mersenne Transrorms , 1972, IEEE Transactions on Computers.

[3] Nussabaumer. Fast Multipliers for Number Theoretic Transforms , 1978, IEEE Transactions on Computers.

[4] Henri J. Nussbaumer. Digital filtering using complex Mersenne transforms , 1976 .

[5] Trieu-Kien Truong,et al. Complex integer convolutions over a direct sum of Galois fields , 1975, IEEE Trans. Inf. Theory.

[6] Henri J. Nussbaumer. Complex convolutions via Fermat number transforms , 1976 .

[7] Issues in nonlinear hyperperfect numbers , 1980 .