Abstract
Let A be a closed set of points in the n-dimensional euclidean space E n . If p and p 1 are points of E n such that 1.1 then p 1 is said to be point-wise closer than p to the set A. If p is such that there is no point p 1 which is point-wise closer than p to A , then p is called a closest point to the set A.
Cite
CITATION STYLE
APA
Motzkin, T. S., & Schoenberg, I. J. (1954). The Relaxation Method for Linear Inequalities. Canadian Journal of Mathematics, 6, 393–404. https://doi.org/10.4153/cjm-1954-038-x
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