数学物理学报(英文版) ›› 2017, Vol. 37 ›› Issue (6): 1607-1618.doi: 10.1016/S0252-9602(17)30094-2

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DECAY RATE OF FOURIER TRANSFORMS OF SOME SELF-SIMILAR MEASURES

高翔, 马际华   

  1. School of Mathematics and Statistics, Wuhan University, Wuhan 430072, China
  • 收稿日期:2017-03-14 出版日期:2017-12-25 发布日期:2017-12-25
  • 通讯作者: Xiang GAO E-mail:gaojiaou@gmail.com
  • 作者简介:Jihua MA,jhma@whu.edu.cn
  • 基金资助:

    Ma's work was supported by NSFC (11271148).

DECAY RATE OF FOURIER TRANSFORMS OF SOME SELF-SIMILAR MEASURES

Xiang GAO, Jihua MA   

  1. School of Mathematics and Statistics, Wuhan University, Wuhan 430072, China
  • Received:2017-03-14 Online:2017-12-25 Published:2017-12-25
  • Contact: Xiang GAO E-mail:gaojiaou@gmail.com
  • Supported by:

    Ma's work was supported by NSFC (11271148).

摘要:

This paper is concerned with the Diophantine properties of the sequence {ξθn}, where 1 ≤ ξ < θ and θ is a rational or an algebraic integer. We establish a combinatorial proposition which can be used to study such two cases in the same manner. It is shown that the decay rate of the Fourier transforms of self-similar measures μλ with λ=θ-1 as the uniform contractive ratio is logarithmic. This generalizes some results of Kershner and Bufetov-Solomyak, who consider the case of Bernoulli convolutions. As an application, we prove that μλ almost every x is normal to any base b ≥ 2, which implies that there exist infinitely many absolute normal numbers on the corresponding self-similar set. This can be seen as a complementary result of the well-known Cassels-Schmidt theorem.

关键词: self-similar measures, Fourier transforms, decay rate, normal numbers

Abstract:

This paper is concerned with the Diophantine properties of the sequence {ξθn}, where 1 ≤ ξ < θ and θ is a rational or an algebraic integer. We establish a combinatorial proposition which can be used to study such two cases in the same manner. It is shown that the decay rate of the Fourier transforms of self-similar measures μλ with λ=θ-1 as the uniform contractive ratio is logarithmic. This generalizes some results of Kershner and Bufetov-Solomyak, who consider the case of Bernoulli convolutions. As an application, we prove that μλ almost every x is normal to any base b ≥ 2, which implies that there exist infinitely many absolute normal numbers on the corresponding self-similar set. This can be seen as a complementary result of the well-known Cassels-Schmidt theorem.

Key words: self-similar measures, Fourier transforms, decay rate, normal numbers