Acta mathematica scientia,Series A ›› 2005, Vol. 25 ›› Issue (1): 130-144.

• Articles • Previous Articles    

Uniform Characterization of Function Spaces by Wavelets

 YANG Ai-Xiang, CHENG Zheng-Xin, BANG Li-Zhong   

  1. 武汉大学数学与统计学院 武汉 西安交通大学理学院 西安 北京大学数学科学院 北京
  • Online:2005-02-25 Published:2005-02-25
  • Supported by:

    国家自然科学基金(10001027、90104004)、国家973项目(1999075105)和武汉大学创新基金资助

Abstract:

Using Littlewood Paley decomposition, Triebel classified most of function spaces into three index function spaces: Besov spaces and Triebel Lizorkin spaces. But such spaces  contain neither real interpolation spaces of two Sobolev spaces L^p(Lorentz spaces), nor dual space and predual space of  Triebel Lizorkin spaces F^{α,q}_1; the authors did not know how to give a uniform description for Triebel Lizorkin spaces and Lorentz spaces. Using wavelets, the authors can give all these spaces a uniform description: Triebel Lizorkin Lorentz spaces, BesovLorentz spaces and dual space and predual space of F^{α,q}_1; furthermore, the authors study also some properties for these spaces.

Key words: Triebel Lizorkin Lorentz spaces and Besov Lorentz spaces, Interpolation spaces, Atomic decomposition; , Dual and predual spaces, Embedding theorem.

CLC Number: 

  • 26B35
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