A class of completely regularizable mappings

The concept of upper and lower semicontinuity of fuzzy mappings introduced by Bao and Wu [Y.E. Bao, C.X. Wu, Convexity and semicontinuity of fuzzy mappings, Comput. Math. Appl., 51 (2006) 1809-1816] is redefined by using the concept of parameterized triples of fuzzy numbers. On the basis of the line

Given an operator space X and a von Neumann algebra A, we consider a contractive mapping q: A eh X eh A Ä NCB(X\*, A) formally defined by q( a j x jk b k )= x jk a j b k , from the extended Haagerup tensor product A eh X eh A into the space of w\*-continuous completely bounded maps from X\* into A.

The main object of this work is to give some conditions for a class of functions to be logarithmically completely monotonic. Our result is shown to be an extension of a result which was proven in the recent literature on this subject.