We prove that for any p perfect set of positive measure and for it's any density point x0 one can construct a measurable function f(x), bounded on [0,1), such that each measurable and bounded function, which coinc...We prove that for any p perfect set of positive measure and for it's any density point x0 one can construct a measurable function f(x), bounded on [0,1), such that each measurable and bounded function, which coincides with f(x) on the set p has diverging Fourier-Walsh series on the point xo.展开更多
In this paper,we consider sets of points with some restricts on the digits of theirα-Lroth expansions.More precisely,for any countable partitionα={An,n∈N}of the unit interval I,we completely determine the Hausdorf ...In this paper,we consider sets of points with some restricts on the digits of theirα-Lroth expansions.More precisely,for any countable partitionα={An,n∈N}of the unit interval I,we completely determine the Hausdorf dimensions of the sets F(α,φ)=x=[l1(x),l2(x),...]α∈I:ln(x)φ(n),n 1,whereφis an arbitrary positive function defined on N satisfyingφ(n)→∞as n→∞.展开更多
文摘We prove that for any p perfect set of positive measure and for it's any density point x0 one can construct a measurable function f(x), bounded on [0,1), such that each measurable and bounded function, which coincides with f(x) on the set p has diverging Fourier-Walsh series on the point xo.
基金supported by National Natural Science Foundation of China (Grant No.11071090)
文摘In this paper,we consider sets of points with some restricts on the digits of theirα-Lroth expansions.More precisely,for any countable partitionα={An,n∈N}of the unit interval I,we completely determine the Hausdorf dimensions of the sets F(α,φ)=x=[l1(x),l2(x),...]α∈I:ln(x)φ(n),n 1,whereφis an arbitrary positive function defined on N satisfyingφ(n)→∞as n→∞.
