On the Range of the Hankel and Extended Hankel Transforms

## Abstract In this paper, we define the Hankel–Wigner transform in Clifford analysis and therefore define the corresponding Weyl transform. We present some properties of this kind of Hankel–Wigner transform, and then give the criteria of the boundedness of the Weyl transform and compactness on the

## Abstract The present research is devoted to some polyconvolutions generated by various integral transforms. For example, we study convolutions for the Hankel transform H__ν__ [__f__ ](__x__) with the following factorization properties: equation image Conditions for the existence of the constru

## Abstract New topologies on the spaces of regular and absolutely regular Hankel‐transformable distributions are proposed and compared. (© 2005 WILEY‐VCH Verlag GmbH & Co. KGaA, Weinheim)

## Abstract In this paper we study generalized Hankel operators ofthe form : ℱ^2^(|__z__ |^2^) → __L__^2^(|__z__ |^2^). Here, (__f__):= (Id–P~__l__~ )($ \bar z $^k^__f__) and P__l__ is the projection onto __A__~__l__~ ^2^(ℂ, |__z__ |^2^):= cl(span{$ \bar z $^__m__^ __z^n^__ | __m__, __n__ ∈ __N__,

Let B m be the unit ball in the m-dimensional complex plane C m with the weighted measure From the viewpoint of the Cauchy-Riemann operator we give an orthogonal direct sum decomposition for L 2 B m dµ α z , i.e., L 2 B m dµ α z = ⊕ n∈Z + σ∈ A σ n , where the components A + + + 0 and A ---0 are jus

its space of convolution operators, and let O O be the predual of O O X . We prove , ࠻ , ࠻ that the topology of uniform convergence on bounded subsets of H H and the strong dual toplogy coincide on O O X . Our technique, involving Mackey topologies, differs , ࠻ from, and is simpler than, those usual