摘要
任意的无理数x,其无理指数δx∶=sup{δ≥0∶|x-pq-1|≤q-2δi.o.pq-1}衡量x可以被有理数逼近的程度.经典的Jarník-Besicovitch定理表明,对于任意的δ≥1,集合{x∈R∶δx≥δ}的Hausdorff维数为δ-1.Barral和Seuret[1]考虑该定理的局部化问题,证明对于任意的连续函数f∶R→[1,+∞),集合{x∈R∶δx≥f(x)}的Hausdorff维数为(inf{f(x)∶x∈R})-1.本文从经典的Jarník-Besicovitch定理出发,利用连分数的理论给出局部Jarník-Besicovitch定理一个简短的证明.
For any irrational number x,the irrational exponentδx∶=sup{δ≥0∶|xpq-1|≤q-2δi.o.pq-1}plays an important role in Diophantine approximation.The classic Jarník-Besicovitch theorem shows that for anyδ≥1,the Hausdorff dimension of the set{x∈R∶δx ≥δ}equalsδ-1.The localization of this theorem is considered by Barral and Seuret[1].They proved that for any continuous function f∶R→[1,+∞),the Hausdorff dimension of the set{x∈R∶δx ≥f(x)}is(inf{f(x)∶x∈ R})-1.In this paper,we give a short proof of the localized Jarník-Besicovitch theorem by continued fraction.
出处
《应用数学》
CSCD
北大核心
2014年第3期467-469,共3页
Mathematica Applicata
基金
国家自然科学基金(11271114)
博士科研启动金(2662013BQ042)
