Estimates for convolution operators on Hardy spaces associated with ball quasi-Banach function spaces
Abstract
Let 0 ≤ α < n, N ∈ N, and let X and Y be ball quasi-Banach function spaces on Rn. We consider operators Tα defined by convolution with kernels of type (α, N). Assuming that the powered Hardy-Littlewood maximal operator satisfies some Fefferman-Stein vector-valued maximal inequality on X and is bounded on the associated space, we prove that T0, α = 0, extends to a bounded operator HX(Rn) X and HX(Rn) HX(Rn); and, under certain additional assumptions on X and Y, Tα, 0 < α < n, extends to a bounded operator HX(Rn) Y and HX(Rn) HY(Rn). In particular, from these results, it follows that singular integrals and the Riesz potential satisfy such estimates, respectively. We also provide an off-diagonal Fefferman-Stein vector-valued inequality for the fractional maximal operator on the p-convexification of ball quasi-Banach function spaces.
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