In this paper, the concept of plus-cogauge is introduced. It is shown that this class of functions can be considered as an extension of the class of so-called min-type functions in normed linear spaces. We deduce that a plus-cogauge is superlinear and continuous, if and only if it is superlinear on the normed space and linear on a nontrivial subspace of . A cone separation theorem for closed radiant sets is obtained, which plays a key role in solving large-scale knowledge-based data classification problems. We shall also identify -linear independent vectors in the Euclidean space to separate a closed radiant set from a point, which does not belong to the set.

• 出版日期2015-2