Let 0【p≤1q【0, and w<sub>1</sub>, w<sub>2</sub> ∈A<sub>1</sub> (Muckenhoupt-class). In this paper the authors prove that the strongly singular convolution operators are bounded...Let 0【p≤1q【0, and w<sub>1</sub>, w<sub>2</sub> ∈A<sub>1</sub> (Muckenhoupt-class). In this paper the authors prove that the strongly singular convolution operators are bounded from the homogeneous weighted Herz-type Hardy spaces HK<sub>q</sub><sup>α,p</sup>(w<sub>1</sub>; w<sub>2</sub>) to the homogeneous weighted Herz spaces K<sub>q</sub><sup>α,p</sup>(w<sub>1</sub>;w<sub>2</sub>), provided α=n(1--1/q). Moreover, the boundedness of these operators on the non-homogeneous weighted Herz-type Hardy spaces HK<sub>q</sub><sup>α,p</sup>(w<sub>1</sub>, w<sub>2</sub>) is also investigated.展开更多
基金the National Natural Science Foundation of China
文摘Let 0【p≤1q【0, and w<sub>1</sub>, w<sub>2</sub> ∈A<sub>1</sub> (Muckenhoupt-class). In this paper the authors prove that the strongly singular convolution operators are bounded from the homogeneous weighted Herz-type Hardy spaces HK<sub>q</sub><sup>α,p</sup>(w<sub>1</sub>; w<sub>2</sub>) to the homogeneous weighted Herz spaces K<sub>q</sub><sup>α,p</sup>(w<sub>1</sub>;w<sub>2</sub>), provided α=n(1--1/q). Moreover, the boundedness of these operators on the non-homogeneous weighted Herz-type Hardy spaces HK<sub>q</sub><sup>α,p</sup>(w<sub>1</sub>, w<sub>2</sub>) is also investigated.
