冈本函数对参数的偏导数

IF 0.1 Q4 MATHEMATICS Real Analysis Exchange Pub Date : 2021-10-22 DOI:10.14321/realanalexch.48.1.1638769133

Nathan Dalaklis, K. Kawamura, Tobey Mathis, Michalis Paizanis

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引用次数: 2

摘要

Okomoto函数的单参数族作为$x$函数的可微性自2005年引入以来已经得到了广泛的分析。作为类似研究的一个类比，在本文中，我们考虑Okomoto函数关于参数$a$的偏导数。我们将重点放在$a=1/3$上，以描述无处可微函数$K（x）$的性质，对于该函数，无穷导数的点集产生了Hausdorff维数为$1$的测度零集的例子。

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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The Partial Derivative of Okamoto's Functions with Respect to the Parameter

The differentiability of the one parameter family of Okomoto's functions as functions of $x$ has been analyzed extensively since their introduction in 2005. As an analogue to a similar investigation, in this paper, we consider the partial derivative of Okomoto's functions with respect to the parameter $a$. We place a significant focus on $a = 1/3$ to describe the properties of a nowhere differentiable function $K(x)$ for which the set of points of infinite derivative produces an example of a measure zero set with Hausdorff dimension $1$.

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