Title: On computable classes of equidistant sets: multivariate equidistant functions Show Chinese title

Title: 可计算的等距集类：多元等距函数

Abstract: An equidistant set in the Euclidean space consists of points having equal distances to both members of a given pair of sets, called focal sets. Having no effective formulas to compute the distance of a point and a set, it is hard to determine the points of an equidistant set in general. Special classes of equidistant sets allow us to approximate the equidistant points in more complicated cases. In the paper we have a hyperplane corresponding to the first order (linear) approximation for one of the focal sets and the second one is considered as the epigraph of a positive-valued continuous function. In the first part of the paper we prove that the equidistant points having equal distances to the epigraph of a positive-valued continuous function and its domain form the graph of a multivariate function. Therefore such an equidistant set is called a multivariate equidistant function. We also prove that the equidistant function one of whose focal sets is constituted by the pointwise minima of finitely many positive-valued continuous functions is given by the pointwise minima of the corresponding equidistant functions. In the second part of the paper we consider equidistant functions belonging to the epigraph of a convex function under some smoothness conditions. Independently of the dimension of the space we present a special parameterization for the equidistant points based on the closest point property of the epigraph as a convex set and we give the characterization of the equidistant functions as well. An example is also presented with a hyperboloid of revolution as one of the focal sets. Show Chinese abstract

Abstract: 欧几里得空间中的等距集由到给定一对集合（称为焦点集）的两个成员距离相等的点组成。由于没有有效的公式来计算点和集合之间的距离，因此在一般情况下很难确定等距集的点。特殊类型的等距集允许我们在更复杂的情况下近似等距点。在本文中，我们有一个超平面对应于其中一个焦点集的一阶（线性）近似，而另一个焦点集被考虑为正值连续函数的上图。在论文的第一部分，我们证明了到正值连续函数的上图及其定义域距离相等的等距点形成了一个多元函数的图像。因此，这样的等距集被称为多元等距函数。我们还证明了其中一个焦点集由有限多个正值连续函数的逐点最小值构成的等距函数是由相应等距函数的逐点最小值给出的。在论文的第二部分，我们考虑在一些光滑性条件下属于凸函数上图的等距函数。无论空间的维数如何，我们基于上图作为凸集的最邻近点性质，提出了等距点的一种特殊参数化方法，并给出了等距函数的特征。还提供了一个例子，其中一个焦点集是旋转双曲面。