摘要
本文研究了二元函数用紧Hausdorff空间上的连续函数集的联合逼近问题,建立了包括特征定理、唯一性定理、强唯一性定理和dela Valle Poussin定理在内的Chebyshev逼近理论。给出了求解最佳逼近元的Remes型第一算法和两种一般的简化方法。
In this paper, we study the problem of simultaneous approximation to biva-riate function by one variate function, i.e., minimizing the expressionover G, G is an noempty subset in C(X) .We obtain the qharacterization theorems, the uniqueness theorems, the strong uniqueness theorems and de la Vallee Poussin theorems. We also establish the first algorithm of Remes type and two limit theorems .
