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CORR
2011
Springer
2011
Springer
Generating and Searching Families of FFT Algorithms
A fundamental question of longstanding theoretical interest is to prove the lowest exact count of real additions and multiplications required to compute a power-of-two discrete Fourier transform (DFT). For 35 years the split-radix algorithm held the record by requiring just 4n log2 n − 6n + 8 arithmetic operations on real numbers for a size-n DFT, and was widely believed to be the best possible. Recent work by Van Buskirk et al. demonstrated improvements to the split-radix operation count by using multiplier coefficients or “twiddle factors” that are not nth roots of unity for a size-n DFT. This paper presents a Boolean Satisfiability-based proof of the lowest operation count for certain classes of DFT algorithms. First, we present a novel way to choose new yet valid twiddle factors for the nodes in flowgraphs generated by common power-of-two fast Fourier transform algorithms, FFTs. With this new technique, we can generate a large family of FFTs realizable by a fixed flowgra...
Real-time TrafficCORR 2011 | Education | FFTs | Size-n Dft | Twiddle Factors |
Related Content
| Added | 28 May 2011 |
| Updated | 28 May 2011 |
| Type | Journal |
| Year | 2011 |
| Where | CORR |
| Authors | Steve Haynal, Heidi Haynal |
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