Add to ORKGA conventional prime factor discrete Fourier transform (DFT) algorithm is used to realize a discrete Fourier-like transform on the finite field, GF(q sub n). A pipeline structure is used to implement this prime factor DFT over GF(q sub n). This algorithm is developed to compute cyclic convolutions of complex numbers and to decode Reed-Solomon codes. Such a pipeline fast prime factor DFT algorithm over GF(q sub n) is regular, simple, expandable, and naturally suitable for VLSI implementation. An example illustrating the pipeline aspect of a 30-point transform over GF(q sub n) is presented
AbstractSince the pioneering work of J. W. Cooley and J. W. Tukey Math. Comp. 19 1965 297–301, a gre...
In this thesis we seek to realize an efficient implementation of a generic parallel fast Fourier tra...
In this brief contribution, an efficient pipeline architecture is proposed for the realization of th...
A prime factor FFT algorithm involving only real valued arithmetic is devised to compute the discret...
A broad class of efficient discrete Fourier transform algorithms is developed by partitioning short ...
Two recently developed ideas, the conversion of a DFT to convolution and the implementation of short...
Prime field arithmetic plays a central role in computer algebra and supports computation in Galois f...
AbstractStandard methods for calculating over GF(pn), the finite field of pn elements, require an ir...
], Knuth [73] and Van Loan [129]. Copyright c fl 1997 R. P. Brent math207/outline 2 DFT, FFT and...
1990 IEEE International Symposium on Circuits and Systems Part 3 (of 4), New Orleans, LA, USA, 1-3 M...
. This paper presents a new fast Discrete Fourier Transform (DFT) algorithm. By rewriting the DFT, a...
AbstractBy generalizing the algebraic discrete Fourier transform (ADFT) for finite commutative rings...
An algebraic theory of the Discrete Fourier Transform is developed in great detail. Examination of t...
[[abstract]]© 1992 Institute of Electrical and Electronics Engineers - A new two-dimensional systoli...
We present a domain-specific approach to generate high-performance hardware-software partitioned imp...
AbstractSince the pioneering work of J. W. Cooley and J. W. Tukey Math. Comp. 19 1965 297–301, a gre...
In this thesis we seek to realize an efficient implementation of a generic parallel fast Fourier tra...
In this brief contribution, an efficient pipeline architecture is proposed for the realization of th...
A prime factor FFT algorithm involving only real valued arithmetic is devised to compute the discret...
A broad class of efficient discrete Fourier transform algorithms is developed by partitioning short ...
Two recently developed ideas, the conversion of a DFT to convolution and the implementation of short...
Prime field arithmetic plays a central role in computer algebra and supports computation in Galois f...
AbstractStandard methods for calculating over GF(pn), the finite field of pn elements, require an ir...
], Knuth [73] and Van Loan [129]. Copyright c fl 1997 R. P. Brent math207/outline 2 DFT, FFT and...
1990 IEEE International Symposium on Circuits and Systems Part 3 (of 4), New Orleans, LA, USA, 1-3 M...
. This paper presents a new fast Discrete Fourier Transform (DFT) algorithm. By rewriting the DFT, a...
AbstractBy generalizing the algebraic discrete Fourier transform (ADFT) for finite commutative rings...
An algebraic theory of the Discrete Fourier Transform is developed in great detail. Examination of t...
[[abstract]]© 1992 Institute of Electrical and Electronics Engineers - A new two-dimensional systoli...
We present a domain-specific approach to generate high-performance hardware-software partitioned imp...
AbstractSince the pioneering work of J. W. Cooley and J. W. Tukey Math. Comp. 19 1965 297–301, a gre...
In this thesis we seek to realize an efficient implementation of a generic parallel fast Fourier tra...
In this brief contribution, an efficient pipeline architecture is proposed for the realization of th...