Special classes of positive and completely positive maps

Characterizations are given for the positive and completely positive maps on n x n complex matrices that leave invariant the diagonal entries or the kth elementary symmetric function of the diagonal entries, 1 < k less than or equal to n. In addition, it is shown that such a positive map is always decomposable if n less than or equal to 3, and this fails to hold if n > 3. The real case is also considered. (C) Elsevier Science Inc., 1997.