|
|
| |
| MINIMIZATION AND BEST APPROXIMATION |
| |
Citation: |
SHI YINGGUANG.MINIMIZATION AND BEST APPROXIMATION[J].Chinese Annals of Mathematics B,1981,2(2):225~231 |
| Page view: 979
Net amount: 695 |
Authors: |
SHI YINGGUANG; |
|
|
| Abstract: |
In this paper we discuss the problem of minimization of a nonnegative function F(x, y) of two variables, i.e., we wish to find an element \(P \in M,M \subset C(X)\) being n subspace, to minimize \({\left\| {F(X,P)} \right\|_\infty }\). For such a problem we have established the theorems of existence, alternation and uniqueness. The results obtained here may be effectively applied to the problems of approximation using a generalized weight function, of simultaneous approximation, of approximation with an additive weight, etc. |
Keywords: |
|
Classification: |
|
|
|
Download PDF Full-Text
|
|
|
|
