Fuzzy matrix partial orderings and generalized inverses

For given complex matrix A and nonzero complex vectors b, c, relationships between generalized inverses of A and generalized inverses of the rank-one-modified matrix M = A + bc \* (with c \* being the conjugate transpose of c) are investigated. The following three questions are considered: (i) when

We show that for a fuzzy partial order R on a ÿnite universe , there is a ÿnite family of fuzzy linear orders {Li: 16i6k} such that R(x; y) = min{ L i (x; y): 16i6k} for all x and y. This generalizes a well-known result on crisp partial orders, which states that each partial order on a ÿnite set is

A nonnegative matrix is called regular if it admits a nonnegative generalized inverse. The structure of such matrices has been studied by several authors. If A is a nonnegative regular matrix, then we obtain a complete description of all nonnegative generalized inverses of A. In particular, it is sh

In this article we study reverse order laws for generalized inverses and re¯exive generalized inverses of the products of multiple matrices e 1 Y F F F Y e n and the products of generalized inverses and re¯exive generalized inverses of e n Y F F F Y e 1 . By applying the multiple product singular va