Reletions between partial moduli of smoothness of functions with monotone Fourier coefficients

I. Simonova, B. Simonov
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Abstract

The problem of estimating the moduli of smoothness of functions from Lqin terms of moduli of smoothness from the broader Lebesgue class Lph as been known for a long time. At the initial stage, in the works of Titchmarsh, Hardy, Littlewood, Nikolsky, the properties of functions from Lipschitz classes were studied and the corresponding embeddings were obtained. For moduli of continuity of functions of one variable P.L. Ulyanov proved an inequality later named after him - "Ulyanov’s inequality". The classical Hardy-Littlewood embedding for Lipschitz spaces is a consequence of Ulyanov’s inequality. As V.A. Andrienko showed, Ulyanov’s inequality is exact in the scale of classes Hωp. Further development of this direction is connected with the works of V.A. Andrienko, E.A. Storozhenko, M.K.Potapov, L. Leindler, V.I. Kolyada, P. Oswald, N. Temirgaliev, S.V. Lapin and other mathematicians. Kolyada proved that Ulyanov’s inequality can be strengthened and proved the corresponding "Kolyada’s inequality". Kolyada’s inequality is exact in the sense that there exists a function in Lp with any given order of the modulus of continuity for which this estimate cannot be improved for any value of δ .Yu.V. Netrusov, M.L. Goldman and W. Trebelz extended Kolyada’s inequality to the moduli of smoothness of higher orders. Another direction of research was the study of fractional moduli of smoothness in the works of M.K. Potapov, B.V. Simonov, S.Yu. Tikhonov. This made it possible to strengthen the Ulyanov inequality and showed the specificity and special significance of using fractional moduli of smoothness, without which, as it turned out, it was impossible to obtain final results. In this article, we study partial moduli of smoothness of functions of two variables. Inequalities are obtained that extend Kolyada’s inequality to partial moduli of smoothness for functions with monotone Fourier coefficients. Estimates are also obtained for the partial moduli of smoothness of the derivative ofa function with monotone Fourier coefficients in terms of the partial moduli of smoothness of the original function.
单调傅立叶系数函数的平滑偏模之间的关系
从广义勒贝格类Lph的光滑模的Lqin项估计函数的光滑模的问题早已为人所知。在初始阶段,Titchmarsh, Hardy, Littlewood, Nikolsky的著作中,研究了Lipschitz类中函数的性质,并得到了相应的嵌入。对于一元函数的连续模,乌里扬诺夫证明了一个不等式,后来以他的名字命名——乌里扬诺夫不等式。Lipschitz空间的经典Hardy-Littlewood嵌入是Ulyanov不等式的结果。正如V.A.安德里延科所证明的,乌里扬诺夫不等式在等级Hωp的尺度上是准确的。这一方向的进一步发展与V.A. Andrienko, E.A. Storozhenko, M.K.Potapov, L. Leindler, V.I. Kolyada, P. Oswald, N. Temirgaliev, S.V. Lapin和其他数学家的工作有关。Kolyada证明了Ulyanov不等式可以强化,并证明了相应的“Kolyada不等式”。Kolyada不等式是精确的,因为在Lp中存在一个连续模的任意阶的函数,对于任意的δ yu值,这个估计都不能改进。Netrusov, M.L. Goldman和W. Trebelz将Kolyada不等式推广到高阶平滑的模。另一个研究方向是M.K. Potapov, B.V. Simonov, s.u u的作品中关于光滑的分数模的研究。Tikhonov。这使得强化乌里扬诺夫不等式成为可能,也显示了使用光滑度分数模的专一性和特殊意义,没有分数模就不可能得到最终结果。本文研究了二元函数光滑性的偏模问题。得到了将Kolyada不等式推广到具有单调傅立叶系数函数的光滑偏模的不等式。对单调傅立叶系数函数的导数的平滑偏模也用原函数的平滑偏模进行了估计。
本文章由计算机程序翻译,如有差异,请以英文原文为准。
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