The L^p norm of the Hilbert transform of the characteristic function of a set is invariant with respect to the structure of the set: it can ben written as an explicit function of its Lebesgue measure and of the exponent p. We show that more is true: there is a fixed ratio, only dependent on p, between the L^p norms of such a Hilbert transform computed on the given set and on the whole line.
On the L^p norms of the Hilbert trasform of a characteristic function
LAENG, ENRICO
2012-01-01
Abstract
The L^p norm of the Hilbert transform of the characteristic function of a set is invariant with respect to the structure of the set: it can ben written as an explicit function of its Lebesgue measure and of the exponent p. We show that more is true: there is a fixed ratio, only dependent on p, between the L^p norms of such a Hilbert transform computed on the given set and on the whole line.File in questo prodotto:
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