Rajula Srivastava scite author profile

Let Z(Ann(r, R)) be the class of all continuous functions f on the annulus Ann(r, R) in C n with twisted spherical mean f × µ s (z) = 0, whenever z ∈ C n and s > 0 satisfy the condition that the sphere S s (z) ⊆ Ann(r, R) and ball B r (0) ⊆ B s (z). In this paper, we give a characterization for functions in Z(Ann(r, R)) in terms of their spherical harmonic coefficients. We also prove support theorems for the twisted spherical means in C n which improve some of the earlier results.

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Lebesgue Space Estimates for Spherical Maximal Functions on Heisenberg Groups

Roos

Seeger

Srivastava

2021

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On the Korányi Spherical maximal function on Heisenberg groups

Srivastava¹

2022

Preprint

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We prove L p → L q estimates for the local maximal operator associated with dilates of the Kóranyi sphere in Heisenberg groups. These estimates are sharp up to endpoints and imply new bounds on sparse domination for the corresponding global maximal operator. We also prove sharp L p → L q estimates for spherical means over the Korányi sphere, which can be used to improve the sparse domination bounds in [10] for the associated lacunary maximal operator.

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A classification of Kaehlerian manifolds satisfying some special conditions

1986

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