High order Riesz transforms and mean value formula for generalized translate operator

Abstract: In this paper, the mean value formula depends on the Bessel-generalized shift operator corresponding to the solutions of the boundary value problem related to the multidimensional Bessel operator are studied. In addition, Riesz transforms R B related to the multidimensional Bessel operators are studied. Since a Bessel-generalized shift operator is a translation operator corresponding to the multidimensional Bessel operator, we construct a family of R B by using a Bessel-generalized shift operator. Finally, we … Show more

“…Generalized convolution generated by a multi-dimensional generalized translation y x is given by Multi-dimensional Poisson operator x , acts to the integrable function f by the formula Multi-dimensional Hankel transform (2) applied to generalized convolution (6) gives…”

Fractional Weighted Spherical Mean and Maximal Inequality for the Weighted Spherical Mean and Its Application to Singular Pde

“…Generalized convolution generated by a multi-dimensional generalized translation y x is given by Multi-dimensional Poisson operator x , acts to the integrable function f by the formula Multi-dimensional Hankel transform (2) applied to generalized convolution (6) gives…”

Fractional Weighted Spherical Mean and Maximal Inequality for the Weighted Spherical Mean and Its Application to Singular Pde

“…First note that, let Ω(x) = P k (x)|x| −m , K(x) = Ω(x)|x| −n−ν and P k range over the homogeneous harmonic polynomials the latter arise in special case α = 1. Then for α > 1, we call the higher order Riesz-Bessel transform where we refer to α as the degree of the higher order Riesz-Bessel transform [1,6,7]. Since P k is homogeneous B-polynomial of degree k in R n + , we shall say that P k is elliptic if P k (x) vanishes only at the origin.…”

“…. , n) and P k (x) is a homogeneous polynomial of degree k in R n + which satisfies ∆ ν P k = 0 (see [6,7]). …”

“…Analogues of Riesz transforms are defined and studied for the Dunkl transform and Laplace-Bessel operator. Especially on the L p space, several authors have studied different aspects of Riesz transforms [1,5,6,7,12,14]. Riesz transform is a singular integral operator with convolution type.…”

“…The idea of considering Riesz transforms on L p spaces investigated with several papers by authors, see [1,5,6,7,12,14]. In [1,5,6,7], the authors looked at the Riesz transforms associated with the Laplace-Bessel operator on R n . Instead of using the ordinary shift operator to generalized shift operator they used a different RieszBessel operator consisting of functions of the form T y where T y is the generalized shift operator and ∆ B are Laplace-Bessel operator.…”

B L m p , ν estimates for the Riesz transforms associated with Laplace-Bessel operator

Dynamics of the Basic Bessel Operator and Related Convolution Operators on Spaces of Entire Functions