New estimates for the Beurling-Ahlfors operator on differential forms
Abstract
We establish new p-estimates for the norm of the generalized Beurling--Ahlfors transform S acting on form-valued functions. Namely, we prove that SLp(n;) Lp(n;)≤ n(p*-1) where p*=\p, p/(p-1)\, thus extending the recent Nazarov--Volberg estimates to higher dimensions. The even-dimensional case has important implications for quasiconformal mappings. Some promising prospects for further improvement are discussed at the end.
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