共查询到20条相似文献,搜索用时 31 毫秒
1.
本文研究了Oppenheim展式中一类例外关系集的Hausdorff维数,作为其应用,我们得到了Lüroth级数展式中一些集合的Hausdorff维数的确切值,并给出了这些确切值的一个估计式 相似文献
2.
We investigate metric properties of the polynomial digits occurring in a large class of Oppenheim expansions of Laurent series, including Lüroth, Engel, and Sylvester expansions of Laurent series and Cantor infinite products of Laurent series. The obtained results cover those for special cases of Lüroth and Engel expansions obtained by Grabner, A. Knopfmacher, and J. Knopfmacher. Our results applied in the cases of Sylvester expansions and Cantor infinite products are original. We also calculate the Hausdorff dimensions of different exceptional sets on which the above-mentioned metric properties fail to hold. 相似文献
3.
We study formal Laurent series which are better approximated by their Oppenheim convergents. We calculate the Hausdorff dimensions of sets of Laurent series which have given polynomial or exponential approximation orders. Such approximations are faster than the approximation of typical Laurent series (with respect to the Haar measure). 相似文献
4.
本文研究了形式级数域中若干连分数例外集.利用质量分布原理和构造特殊覆盖,得到了当连分数展式部分商的度分别以多项式速度和指数速度趋向无穷大时,分别对应例外集的Hausdorff维数. 相似文献
5.
本文研究了Engel连分数展式中部分商以某种速度增长的集合的Hausdorff维数.利用自然覆盖和质量分布原理,得到了集合B(α)={x∈(0,1):lim n→∞ log bn+1(x)/log bn(x)=α}的Hausdorff维数是1/α的结果. 相似文献
6.
De Mathan [B. de Mathan, Approximations diophantiennes dans un corps local, Bull. Soc. Math. France, Suppl. Mém. 21 (1970)] proved that Khintchine's theorem on homogeneous Diophantine approximation has an analogue in the field of formal Laurent series. Kristensen [S. Kristensen, On the well-approximable matrices over a field of formal series, Math. Proc. Cambridge Philos. Soc. 135 (2003) 255–268] extended this metric theorem to systems of linear forms and gave the exact Hausdorff dimension of the corresponding exceptional sets. In this paper, we study the inhomogeneous Diophantine approximation over a field of formal Laurent series, the analogue Khintchine's theorem and Jarnik–Besicovitch theorem are proved. 相似文献
7.
TheHAUSDORFFDIMENSIONANDMEASUREOFTHEGENERALIZEDMORANFRACTALSANDFOURIERSERIES¥RENFUThO;LIANGJINRONGAbstract:Thispaperstudiesth... 相似文献
8.
For any formal Laurent series with coefficients cn lying in some given finite field, let x=[a0(x);a1(x),a2(x),…] be its continued fraction expansion. It is known that, with respect to the Haar measure, almost surely, the sum of degrees of partial quotients grows linearly. In this note, we quantify the exceptional sets of points with faster growth orders than linear ones by their Hausdorff dimension, which covers an earlier result by J. Wu. 相似文献
9.
Li-Min Shi 《Journal of Mathematical Analysis and Applications》2006,318(1):190-198
In this paper we obtain a lower bound for the Hausdorff dimension of recurrent sets and, in a general setting, we show that a conjecture of Dekking [F.M. Dekking, Recurrent sets: A fractal formalism, Report 82-32, Technische Hogeschool, Delft, 1982] holds. 相似文献
10.
范金华 《数学年刊A辑(中文版)》2005,(5)
本文研究平面区域上K-qc映射的不可微集合的Hausdorff维数.对任何K>1,给出了平面区域上一个具体的K-qc映射,它的不可微集合的Hausdorff维数为2. 相似文献
11.
一个从闭区间到自身的连续映射被称为3阶非单谷Feigenbaum映射,如果它是函数方程f~3(λx)=λf(x)的解.本文讨论了3阶非单谷Feigenbaum映射的拟极限集及其Hausdorff维数.3阶非单谷Feigenbaum映射必然产生混沌,混沌的产生使得拟极限集的存在性问题复杂化.文中采用分形几何中的知识方法证明了此类映射的拟极限集的存在性,并相应的对其Hausdorff维数作出了估计.最后给了一个具体的例子,说明确实存在这样的3阶非单谷Feigenbaum映射. 相似文献
12.
本文主要研究实数的Cantor级数展开式. 通过构造Moran集的方法, 确定了由Cantor级数中不同字符个数的渐近值所定义的一类集合的Hausdorff维数. 本文结果可视为Erdös 和Renyi关于Cantor级数统计性质研究的补充. 相似文献
13.
本文主要研究实数的Cantor级数展开式.通过构造Moran集的方法,确定了由Cantor级数中不同字符个数的渐近值所定义的一类集合的Hausdorff维数.本文结果可视为Erd¨os和Renyi关于Cantor级数统计性质研究的补充. 相似文献
14.
GEOMETRY AND DIMENSION OF SELF—SIMILAR SET 总被引:1,自引:0,他引:1
The authors show that the self-similar set for a finite family of contractive similitudes (similarities, i.e., |fi(x) - fi(y)| = αi|x - y|, x,y ∈ RN, where 0 < αi < 1) is uniformly perfect except the case that it is a singleton. As a corollary, it is proved that this self-similar set has positive Hausdorff dimension provided that it is not a singleton. And a lower bound of the upper box dimension of the uniformly perfect sets is given. Meanwhile the uniformly perfect set with Hausdorff measure zero in its Hausdorff dimension is given. 相似文献
15.
Wei Wang & Li Liao 《数学研究通讯:英文版》2012,28(2):137-145
A continuous map from a closed interval into itself is called a $p$-order
Feigenbaum's map if it is a solution of the Feigenbaum's equation $f^p
(λx) = λf(x)$.
In this paper, we estimate Hausdorff dimensions of likely limit sets of some $p$-order
Feigenbaum's maps. As an application, it is proved that for any $0 < t < 1$, there
always exists a $p$-order Feigenbaum's map which has a likely limit set with Hausdorff
dimension $t$. This generalizes some known results in the special case of $p = 2$. 相似文献
16.
17.
In this paper,we provide a new effective method for computing the exact value of Hausdorff measures of a class of self-similar sets satisfying the open set condition(OSC).As applications,we discuss a self-similar Cantor set satisfying OSC and give a simple method for computing its exact Hausdorff measure. 相似文献
18.
Balázs Bárány 《Journal of Mathematical Analysis and Applications》2011,383(1):244-258
The dimension theory of self-similar sets is quite well understood in the cases when some separation conditions (open set condition or weak separation condition) or the so-called transversality condition hold. Otherwise the study of the Hausdorff dimension is far from well understood. We investigate the properties of the Hausdorff dimension of self-similar sets such that some functions in the corresponding iterated function system share the same fixed point. Then it is not possible to apply directly known techniques. In this paper we are going to calculate the Hausdorff dimension for almost all contracting parameters and calculate the proper dimensional Hausdorff measure of the attractor. 相似文献
19.
本文给出递归集的Hausdorff维数的下界估计,并由此确定了一类递归集的维数,所获结果包含并推广了Bedford,Dekking及文志英、钟红柳等人的有关结果。 相似文献
20.
Engel连分数展式与Huasdorff维数 总被引:1,自引:0,他引:1
本文研究了Engel连分数中部分商以某种速度增长的集合,以及Engel连分数展式收敛速度较快的点组成的集合,利用质量分布原理,证明了这些集合的Haus-dorff维数为1. 相似文献