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
We split the classical Hilbert transform into the sum of two convolution integrals, one supported aw...
AbstractIn this paper we characterize the behavior of the sequence of the Lp-norm of primitives of a...
We split the classical Hilbert transform into the sum of two convolution integrals, one supported aw...
The L^p norm of the Hilbert transform of the characteristic function of a set is invariant with resp...
The L^p norm of the Hilbert transform of the characteristic function of a set is invariant with resp...
The L^p norm of the Hilbert transform of the characteristic function of a set is invariant with resp...
The essential norm of the Hilbert transform acting in weighted Lebesgue spaces with variable exponen...
We give an alternative proof of a theorem of Stein and Weiss: The distribution function of the Hilbe...
We give an alternative proof of a theorem of Stein and Weiss: The distribution function of the Hilbe...
We give an alternative proof of a theorem of Stein and Weiss: The distribution function of the Hilbe...
We give an alternative proof of a theorem of Stein and Weiss: The distribution function of the Hilbe...
Abstract. We show that the norm of the Hilbert transform as an operator in the weighted space Lp R (...
The two power-weight (Lpu, Lqv) norm inequalities for the Hilbert transform on the cones of monotone...
We split the classical Hilbert transform into the sum of two convolution integrals, one supported aw...
We split the classical Hilbert transform into the sum of two convolution integrals, one supported aw...
We split the classical Hilbert transform into the sum of two convolution integrals, one supported aw...
AbstractIn this paper we characterize the behavior of the sequence of the Lp-norm of primitives of a...
We split the classical Hilbert transform into the sum of two convolution integrals, one supported aw...
The L^p norm of the Hilbert transform of the characteristic function of a set is invariant with resp...
The L^p norm of the Hilbert transform of the characteristic function of a set is invariant with resp...
The L^p norm of the Hilbert transform of the characteristic function of a set is invariant with resp...
The essential norm of the Hilbert transform acting in weighted Lebesgue spaces with variable exponen...
We give an alternative proof of a theorem of Stein and Weiss: The distribution function of the Hilbe...
We give an alternative proof of a theorem of Stein and Weiss: The distribution function of the Hilbe...
We give an alternative proof of a theorem of Stein and Weiss: The distribution function of the Hilbe...
We give an alternative proof of a theorem of Stein and Weiss: The distribution function of the Hilbe...
Abstract. We show that the norm of the Hilbert transform as an operator in the weighted space Lp R (...
The two power-weight (Lpu, Lqv) norm inequalities for the Hilbert transform on the cones of monotone...
We split the classical Hilbert transform into the sum of two convolution integrals, one supported aw...
We split the classical Hilbert transform into the sum of two convolution integrals, one supported aw...
We split the classical Hilbert transform into the sum of two convolution integrals, one supported aw...
AbstractIn this paper we characterize the behavior of the sequence of the Lp-norm of primitives of a...
We split the classical Hilbert transform into the sum of two convolution integrals, one supported aw...
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