A description of the image of a certain space of functions or generalized functions on a locally compact group under the fourier transform or under some other injective integral transform is called an analogue of the paleywiener theorem. The proofs seem to be new also in the special case of the fourier transform. The paper also shows that if n is any connected, simply connected nilpotent lie group, then almost all. A generalized paleywiener theorem connecting repositories.
We prove a paley wiener theorem for a class of symmetric spaces of the compact type, in which all root multiplicities are even. Abstractthis paper concerns itself with the problem of generalizing to nilpotent lie groups a weak form of the classical paleywiener theorem for rn the generalization is accomplished for a large subclass of. As an application, results on the solvability of a single differential equation on a symmetric space are derived. These estimates are used to prove a paley wiener type theorem for compactly supported functions from extended gevrey classes. On the schwartzbruhat space and the paleywiener theorem for. The aim of this article is to give an overview of several types of paley wiener theorems occuring in harmonic analysis related to symmetric spaces. On the paleywiener theorem in the mellin transform. This paper concerns itself with the problem of generalizing to nilpotent lie groups a weak form of the classical paley wiener theorem for r n the generalization is accomplished for a large subclass of nilpotent lie groups, as well as for an interesting example not in this subclass. Associated with the dirac operator and partial derivatives, this paper establishes some real paley wiener type theorems to characterize the cliffordvalued functions whose clifford fourier transform cft has compact support. As noted in the last section, as a corollary of the paley wiener theorem for test functions, fourier transforms of arbitrary distributions exist, and lie in the dual of the paley wiener space pw. A paley wiener theorem for reductive symmetric spaces. Suppose that t is a closed operator and that t is densely defined, i. Abstractafter the analysis of the qeven translation and the qcosine fourier transform by a. We give an elementary proof of the paley wiener theorem for smooth functions for the dunkl transforms on the real line, establish a similar theorem for l2functions and prove identities in the spirit of bang for lpfunctions.
A paleywiener theorem for real reductive groups project euclid. A version of paley wiener like theorem for connected, simply connected nilpotent lie groups is proven. Paleywiener theorems on a symmetric space and their. A paleywiener theorem for reductive symmetric spaces. Extending the paley wiener theorem to locally compact abelian groups involves both finding a suitable laplace transform and a suitable analogue for analytic functions. In this paper we shall give a proof of the paley wiener theorem for hyperfunctions supported by a convex compact set by the heat kernel method. We generalize opdams estimate for the hypergeometric functions in a bigger domain with the multiplicity parameters being not necessarily positive, which is crucial. Let x gh be a reductive symmetric space and k a maximal compact subgroup of g. We consider the problem of representing an analytic function on a vertical strip by a bilateral laplace transform. The aim of this article is to give an overview of several types of paley wiener theorems occuring in harmonic analysis related to. A paley wiener theorem for real reductive groups by james arthur i. Section 3 contains the paley wiener theorem for smooth functions and canperhapsserve as a model for a proof of such a theorem in other contexts. The paleywiener theorem and the local huygens principle.
Here we give a new approach to the paley wiener theorem in a mellin analysis setting which avoids the use of the riemann surface of the logarithm and analytical branches and is based on new concepts of polaranalytic function in the mellin setting and mellinbernstein spaces. He won a smiths prize in 1930 and was elected a fellow of trinity college his contributions include the paley construction for. Paleywiener theorems for the dunkl transform and dunkl. An elementary proof of the paleywiener theorem in ct citeseerx. C n,n is invertible, its condition number in pnorm is denoted by. As an application, we show how versions of classical paleywiener theorems can be derived from the real ones via an approach which does not involve domain. We give a paley wiener theorem for weighted bergman spaces on the existence of such representa. A paley wiener theorem for the inverse fourier transform on some homogeneous spaces thangavelu, s. The case of sl2r was solved by ehrenpreis and mautner 5 a, 5 b. From there he entered trinity college, cambridge where he showed himself as a brilliant student. However, i have looked up the proof in paley and wiener and i find it far too technical and nonselfcontained for me to follow with any ease. Request pdf on the paley wiener theorem in the mellin transform setting in this paper we establish a version of the paley wiener theorem of fourier analysis in the frame of the mellin transform. These operators permit also to define and study dunkl translation operators and.
Department of mathematics, university of chicago, chicago, illinois 60637. Real paleywiener theorems for the clifford fourier transform. The original theorems did not use the language of distributions, and instead applied to squareintegrable functions. A paleywiener theorem for selected nilpotent lie groups. A proof of the paley wiener theorem for hyperfunctions with a convex compact support by the heat kernel method suwa, masanori and yoshino, kunio, tokyo journal of mathematics, 2004. Mellinfourier series and the classical mellin transform wavelet filtering with the mellin transform mellin transform of cpmg data optical mellin transform through haar wavelet transformation. Unlike the classical paley wiener theorem, our theorems use real variable techniques and do not require analytic continuation to the. Paleywienertype theorems for a class of integral transforms. Raymond edward alan christopher paley 7 january 1907 7 april 1933 was an english mathematician. A characterization of weighted l 2 i spaces in terms of their images under various integral transformations is derived, where i is an interval finite or infinite. Pdf a paleywiener theorem for reductive symmetric spaces. Abstractanalogue results of the classical paley wiener theorems that characterize classes of functions with compact support in terms of their fourier transform are given for some subspaces of square integrable functions over a white noise space. Pdf paleywiener theorem for the weinstein transform and. A paleywiener theorem for the askeywilson function.
The rest of the paper is independent 2000 mathematics subject classi. A paley wiener theorem for real reductive groups an open dense subset of g. Paley wiener theorem for the weinstein transform and applications. A paley wiener theorem for locally compact abelian groups by gunar e. These operators permit also to define and study dunkl translation operators and dunkl convolution product. Deleeuws theorem on littlewood paley functions chen, changpao, fan, dashan, and sato, shuichi, nagoya mathematical journal, 2002. On the paleywiener theorem in the mellin transform setting.
A test function fsupported on a closed ball b r of radius rat the origin in r has fourier. C n,n is the nonsingular eigenvector matrix such that a v. We give an elemenlary proof of the paleywiener theorem in several complex variables using. The image under the fourier transform of the space of kfinite compactly. As an application, we show how versions of classical paley wiener theorems can be derived from the real ones via an approach which does not involve domain shifting and which may be put to good use. In mathematics, a paley wiener theorem is any theorem that relates decay properties of a function or distribution at infinity with analyticity of its fourier transform. Pdf in this paper our aim is to establish the paley wiener theorem for the weinstein transform. Zayed, paleywienertype theorems for a class of integral transforms, j. Paley wiener theorems for some types of function spaces on a riemannian symmetric space are proved. Based on the riemannlebesgue theorem for the cft, the boas theorem is provided to describe the cft of cliffordvalued functions that vanish on a neighborhood of. This characterization is then used to derive paleywienertype theorems for these spaces.
As an application, we discuss properties of the corresponding wave front sets. Real paleywiener theorems and local spectral radius formulas. The theorem is named for raymond paley 19071933 and norbert wiener 18941964. A number of authors have proved paleywiener theorems for particular classes of groups. Bouzeffour in qcosine fourier transform and qheat equation, ramanujan j. For functions of a single variable, the theorem states that if is a continuously differentiable function with nonzero derivative at the point a. Codimensionp paley wiener theorems yang, yan, qian, tao, and. We define an analogue of the paley wiener space in the context of the askeywilson function transform, compute explicitly its reproducing kernel and prove that the growth of functions in this space of entire functions is of order two and type ln q. The theorem describes the multipliers in a form which is remarkably similar to the cutoff functions b. On the paley wiener theorem in the mellin transform setting. In this paper our aim is to establish the paley wiener theorems for the weinstein transform. Paleywiener theorem for the weinstein transform and. The aim of this paper is to exhibit a real paley wiener space sitting inside the schwartz space, and to give a quick and simple proof of a paley wien we use cookies to. For each of these spaces, we prove a paley wiener theorem, some structure theorems, and provide some applications.
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