On the lp-norm of the discrete Hilbert transform
Abstract
Using a representation of the discrete Hilbert transform in terms of martingales arising from Doob h-processes, we prove that its lp-norm, 1<p<∞, is bounded above by the Lp-norm of the continuous Hilbert transform. Together with the already known lower bound, this resolves the long-standing conjecture that the norms of these operators are equal.
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