In this article, we prove the following statement that is true for both unbounded and bounded Vilenkin systems: for any ε∈ (0, 1), there exists a measurable set E C [0, 1) of measure bigger than 1 - s such that ...In this article, we prove the following statement that is true for both unbounded and bounded Vilenkin systems: for any ε∈ (0, 1), there exists a measurable set E C [0, 1) of measure bigger than 1 - s such that for any function f ∈ LI[0, 1), it is possible to find a function g ∈ L^1 [0, 1) coinciding with f on E and the absolute values of non zero Fourier coefficients of g with respect to the Vilenkin system are monotonically decreasing.展开更多
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
基金supported by State Committee Science MES RA,in frame of the research project N SCS 13-1A313
文摘In this article, we prove the following statement that is true for both unbounded and bounded Vilenkin systems: for any ε∈ (0, 1), there exists a measurable set E C [0, 1) of measure bigger than 1 - s such that for any function f ∈ LI[0, 1), it is possible to find a function g ∈ L^1 [0, 1) coinciding with f on E and the absolute values of non zero Fourier coefficients of g with respect to the Vilenkin system are monotonically decreasing.
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.
