AbstractWe 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 explicit fast algorithms for particular inverse semigroups of interest—specifically, for the rook monoid and its wreath products by arbitrary finite groups
AbstractIn this paper the complexity of computing the General Discrete Fourier Transform over group ...
The problem of verifying the nonnegativity of a real valued function on a finite set is a long-stand...
This article reveals the basic techniques of fourier analysis on a finite abelian group .It may be u...
AbstractWe extend the theory of fast Fourier transforms on finite groups to finite inverse semigroup...
AbstractIn this paper fast Fourier transform algorithms (FFTs) are constructed for wreath products o...
Let G be a finite group and f any complex-valued function defined on G and ae an irreducible comple...
This paper introduces new techniques for the efficient computation of a Fourier transform on a finit...
AbstractLet G be a finite group and f any complex-valued function defined on G and ϱ an irreducible ...
The finite Fourier transform is discussed from the viewpoint of finite dimensional algebras over com...
In this thesis, we present a new class of algorithms that determine fast Fourier transforms for a gi...
A discrete Fourier transform, or DFT, is an isomorphism from a group algebra to a direct sum of matr...
In this paper we will naturally extend the concept of Fourier analysis to functions on arbitrary gro...
AbstractThis paper presents a new algorithm for constructing a complete list of pairwise inequivalen...
The discrete Fourier transform on a group G converts data associated with group elements to a basis ...
AbstractLet G be a f inite group. Then Ls(G), the linear complexity of a suitable Wedderburn transfo...
AbstractIn this paper the complexity of computing the General Discrete Fourier Transform over group ...
The problem of verifying the nonnegativity of a real valued function on a finite set is a long-stand...
This article reveals the basic techniques of fourier analysis on a finite abelian group .It may be u...
AbstractWe extend the theory of fast Fourier transforms on finite groups to finite inverse semigroup...
AbstractIn this paper fast Fourier transform algorithms (FFTs) are constructed for wreath products o...
Let G be a finite group and f any complex-valued function defined on G and ae an irreducible comple...
This paper introduces new techniques for the efficient computation of a Fourier transform on a finit...
AbstractLet G be a finite group and f any complex-valued function defined on G and ϱ an irreducible ...
The finite Fourier transform is discussed from the viewpoint of finite dimensional algebras over com...
In this thesis, we present a new class of algorithms that determine fast Fourier transforms for a gi...
A discrete Fourier transform, or DFT, is an isomorphism from a group algebra to a direct sum of matr...
In this paper we will naturally extend the concept of Fourier analysis to functions on arbitrary gro...
AbstractThis paper presents a new algorithm for constructing a complete list of pairwise inequivalen...
The discrete Fourier transform on a group G converts data associated with group elements to a basis ...
AbstractLet G be a f inite group. Then Ls(G), the linear complexity of a suitable Wedderburn transfo...
AbstractIn this paper the complexity of computing the General Discrete Fourier Transform over group ...
The problem of verifying the nonnegativity of a real valued function on a finite set is a long-stand...
This article reveals the basic techniques of fourier analysis on a finite abelian group .It may be u...