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Necessary condition for measures which are $(L^{q}, L^{p})$ multipliers

Bérenger Akon Kpata, Ibrahim Fofana, Konin Koua (2009)

Annales mathématiques Blaise Pascal

Let $G$ be a locally compact group and $ρ$ the left Haar measure on $G$ . Given a non-negative Radon measure $μ$ , we establish a necessary condition on the pairs $(q, p)$ for which $μ$ is a multiplier from $L^{q} (G, ρ)$ to $L^{p} (G, ρ)$ . Applied to $ℝ^{n}$ , our result is stronger than the necessary condition established by Oberlin in [14] and is closely related to a class of measures defined by Fofana in [7].When $G$ is the circle group, we obtain a generalization of a condition stated by Oberlin [15] and improve on it in some cases.

Displaying 1 – 5 of 5

Necessary condition for measures which are $(L^{q}, L^{p})$ multipliers

Negatively curved groups and the convergence property. II: Transitivity in negatively curved groups.

Non singular transformations and spectral analysis of measures

Non-archimedean (uniformly) continuous measures on homogeneous spaces

Norm- and weak-continuity of translations of measures: A counterexample.

Currently displaying 1 – 5 of 5

Displaying 1 – 5 of 5

Necessary condition for measures which are ( L q , L p ) multipliers

Negatively curved groups and the convergence property. II: Transitivity in negatively curved groups.

Non singular transformations and spectral analysis of measures

Non-archimedean (uniformly) continuous measures on homogeneous spaces

Norm- and weak-continuity of translations of measures: A counterexample.

Currently displaying 1 – 5 of 5

Necessary condition for measures which are $(L^{q}, L^{p})$ multipliers