Rough singular integrals and maximal operators with mixed homogeneity along compound curves

Abstract: The parabolic singular integrals along certain compound curves as well as the related maximal operators are considered. Under rather weakened size conditions on the integral kernels both on the unit sphere and in the radial direction, the Lp‐mapping properties for such operators are established. Some previous results are greatly extended and improved.

“…More precisely, the above authors established the bounds for ℎ,Ω with |1/ − 1/2| < 1/ max{2, } − 1/ if ℎ ∈ Δ (R + ) for > 1 and Ω ∈ F (S −1 ) for some > max{ , 2}. Recently, Liu and Wu [7] extended the result of [1] to the singular integrals along polynomial compound curves in the mixed homogeneity setting.…”

Boundedness and Continuity of Several Integral Operators with Rough Kernels inWFβSn-1

Liu

¹

2018

Journal of Function Spaces

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“…More precisely, the above authors established the bounds for ℎ,Ω with |1/ − 1/2| < 1/ max{2, } − 1/ if ℎ ∈ Δ (R + ) for > 1 and Ω ∈ F (S −1 ) for some > max{ , 2}. Recently, Liu and Wu [7] extended the result of [1] to the singular integrals along polynomial compound curves in the mixed homogeneity setting.…”

Boundedness and Continuity of Several Integral Operators with Rough Kernels inWFβSn-1

Liu

¹

2018

Journal of Function Spaces

Self Cite

1

0

2

0

View full textAdd to dashboardCite

Boundedness and continuity of maximal singular integrals and maximal functions on Triebel-Lizorkin spaces

Mixed radial-angular integrability for rough maximal operators