Basics of Multiple Polyexponential Integrals

Gleb Aminov, Paolo Arnaudo
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Abstract

We introduce a set of special functions called multiple polyexponential integrals, defined as iterated integrals of the exponential integral $\text{Ei}(z)$. These functions arise in certain perturbative expansions of the local solutions of second-order ODEs around an irregular singularity. In particular, their recursive definition describes the asymptotic behavior of these local solutions. To complement the study of the multiple polyexponential integrals on the entire complex plane, we relate them with two other sets of special functions - the undressed and dressed multiple polyexponential functions - which are characterized by their Taylor series expansions around the origin.
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多重多项式积分的基础知识
我们引入了一组称为多重多指数积分的特殊函数,它们被定义为指数积分$\text{Ei}(z)$的迭代积分。这些函数出现在不规则奇点周围二阶 ODEs 局部解的某些扰动展开中。特别是,它们的递归定义描述了这些局部解的渐近行为。为了补充对整个复平面上多重多指数积分的研究,我们将它们与另外两组特殊函数联系起来,这两组特殊函数分别是未着色多重多指数函数和着色多重多指数函数,它们以围绕原点的泰勒级数展开为特征。
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