Lower bounds for the weak-type constants of the operators m
Abstract
The operators m (m∈N \0\) arise when one studies the action of the Beurling-Ahlfors transform on certain radial function subspaces. It is known that the weak-type (1,1) constant of 0 is equal to 1/(2)≈ 1.44. We construct examples showing that the weak-type (1,1) constant of 1 is larger than 1.38 and that the weak-type (1,1) constant of m does not tend to 1 when m∞. This disproves a conjecture of Gill [Mich. Math. J. 59 (2010), No. 2, 353-363]. We also prove a companion result for the adjoint operators. This is the arXiv version of the paper - it includes some additional discussion in the appendices.
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