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2 Commentationes Mathematicae

2 2019

2 Meskhi A.

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Essential norm estimates for multilinear singular and fractional integrals

100%

Meskhi A.

nr 1-2

We derive lower two-weight estimates for the essential norm (measure of noncompactness) for multilinear Hilbert and Riesz transforms, and Riesz potential operators in Banach function lattices. As a corollary we have appropriate results in weighted Lebesgue spaces. From these statements we conclude that there is no \((m+1)\)-tuple of weights \((v,w_1, \dots, w_m)\) for which these operators are compact from \(L^{p_1}_{w_1} \times \dots \times L^{p_m}_{w_m}\) to \(L^q_v\).

Essential norm estimates for multilinear singular and fractional integrals

86%

Meskhi A.

tom Vol. 59, No. 1/2

81--93

We derive lower two-weight estimates for the essential norm (measure of noncompactness) for multilinear Hilbert and Riesz transforms, and Riesz potential operators in Banach function lattices. As a corollary we have appropriate results in weighted Lebesgue spaces. From these statements we conclude that there is no (m + 1)-tuple of weights (v, w1, wm) for which these operators are compact from Lw1p1 ×…×Lwmpm to Lvq.