The (finite field) Fast Fourier Transform
ثبت نشده
چکیده
There are numerous directions from which one can approach the subject of the fast Fourier Transform (FFT). It can be explained via numerous connections to convolution, signal processing, and various other properties and applications of the algorithm. We (along with Geddes/Czapor/Labahn) take a rather simple view from the algebraic manipulation standpoint. As will be apparent shortly, we relate the FFT to the evaluation of a polynomial. We also consider it of interest primarily as an algorithm in a discrete (finite) computation structure rather than over the complex numbers.
منابع مشابه
A Method for Fast Computation of the Fourier Transform over a Finite Field
—We consider the problem of fast computation of the Fourier transform over a finite field by decomposing an arbitrary polynomial into a sum of linearized polynomials. Examples of algorithms for the Fourier transform with complexity less than that of the best known analogs are given.
متن کاملNumerical methods for the stray-field calculation: A comparison of recently developed algorithms
Different numerical approaches for the stray-field calculation in the context of micromagnetic simulations are investigated. We compare finite difference based fast Fourier transform methods, tensor-grid methods and the finite-element method with shell transformation in terms of computational complexity, storage requirements and accuracy tested on several benchmark problems. These methods can b...
متن کاملComputational Complexity of Fourier Transforms Over Finite Fields*
In this paper we describe a method for computing the Discrete Fourier Transform (DFT) of a sequence of n elements over a finite field GF(pm) with a number of bit operations 0(nm log(nm) ■ P(q)) where P(q) is the number of bit operations required to multiply two q-bit integers and q = 2 log2« + 4 log2m + 4 log2p. This method is uniformly applicable to all instances and its order of complexity is...
متن کاملThe (finite field) Fast Fourier Transform
There are numerous directions from which one can approach the subject of the fast Fourier Transform (FFT). It can be explained via numerous connections to convolution, signal processing, and various other properties and applications of the algorithm. We (along with Geddes/Czapor/Labahn) take a rather simple view from the algebraic manipulation standpoint. As will be apparent shortly, we relate ...
متن کاملFast Fourier Transforms for Finite Inverse Semigroups
We extend the theory of fast Fourier transforms on finite groups to finite inverse semigroups. We use a general method for constructing the irreducible representations of a finite inverse semigroup to reduce the problem of computing its Fourier transform to the problems of computing Fourier transforms on its maximal subgroups and a fast zeta transform on its poset structure. We then exhibit exp...
متن کامل