Convolution operators and variable Hardy spaces on the Heisenberg group
Abstract
Let Hn be the Heisenberg group. For 0 ≤ α < Q=2n+2 and N ∈ N we consider exponent functions p(·) : Hn (0, +∞), which satisfies H\"older conditions, such that QQ+N < p- ≤ p(·) ≤ p+ < Qα. In this article we prove the Hp(·)(Hn) Lq(·)(Hn) and Hp(·)(Hn) Hq(·)(Hn) boundedness of convolution operators with kernels of type (α, N) on Hn, where 1q(·) = 1p(·) - αQ. In particular, the Riesz potential on Hn satisfies such estimates.
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