Sparse Endpoint Estimates for Bochner-Riesz Multipliers on the Plane
Abstract
For 0< λ < 12, let Bλ be the Bochner-Riesz multiplier of index λ on the plane. Associated to this multiplier is the critical index 1 < pλ = 4 3+2 λ < 43. We prove a sparse bound for Bλ with indices (pλ , q), where pλ ' < q < 4. This is a further quantification of the endpoint weak Lpλ boundedness of Bλ , due to Seeger. Indeed, the sparse bound immediately implies new endpoint weighted weak type estimates for weights in A1 RH , where > 4 4 - 3 pλ .
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