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$L^{p}$ -improving properties of measures of positive energy dimension

Kathryn E. Hare, Maria Roginskaya (2005)

Colloquium Mathematicae

A measure is called $L^{p}$ -improving if it acts by convolution as a bounded operator from $L^{p}$ to $L^{q}$ for some q > p. Positive measures which are $L^{p}$ -improving are known to have positive Hausdorff dimension. We extend this result to complex $L^{p}$ -improving measures and show that even their energy dimension is positive. Measures of positive energy dimension are seen to be the Lipschitz measures and are characterized in terms of their improving behaviour on a subset of $L^{p}$ -functions.

Displaying 1 – 6 of 6

$L^{p}$ -improving properties of measures of positive energy dimension

Lattice normality and outer measures.

Lattice separation and measures.

Lattice separation, coseparation and regular measures.

Limiting case of the boundedness of fractional integral operators on nonhomogeneous space.

Locally finite Borel measures in Radon spaces.

Currently displaying 1 – 6 of 6

Displaying 1 – 6 of 6

L p -improving properties of measures of positive energy dimension

Lattice normality and outer measures.

Lattice separation and measures.

Lattice separation, coseparation and regular measures.

Limiting case of the boundedness of fractional integral operators on nonhomogeneous space.

Locally finite Borel measures in Radon spaces.

Currently displaying 1 – 6 of 6

$L^{p}$ -improving properties of measures of positive energy dimension