This paper studies the following two problems: Problem I. Given X, B is-an-element-of R(n x m), find A is-an-element-of P(s,n), such that AX = B, where Ps, n = {A is-an-element-of SR(n x n)\x(T) Ax greater-than-or-equ...This paper studies the following two problems: Problem I. Given X, B is-an-element-of R(n x m), find A is-an-element-of P(s,n), such that AX = B, where Ps, n = {A is-an-element-of SR(n x n)\x(T) Ax greater-than-or-equal-to 0, for-all S(T) x = 0, for given S is-an-element-of R(p)n x p}. Problem II. Given A* is-an-element-of R(n x n), find A is-an-element-of S(E), such that \\A*-A\\ = inf(A is-an-element-of S(E) \\A*-A\\ where S(E) denotes the solution set of Problem I. The necessary and sufficient conditions for the solvability of Problem I, the expression of the general solution of Problem I and the solution of Problem II are given for two cases. For the general case, the equivalent form of conditions for the solvability of Problem I is given.展开更多
文摘This paper studies the following two problems: Problem I. Given X, B is-an-element-of R(n x m), find A is-an-element-of P(s,n), such that AX = B, where Ps, n = {A is-an-element-of SR(n x n)\x(T) Ax greater-than-or-equal-to 0, for-all S(T) x = 0, for given S is-an-element-of R(p)n x p}. Problem II. Given A* is-an-element-of R(n x n), find A is-an-element-of S(E), such that \\A*-A\\ = inf(A is-an-element-of S(E) \\A*-A\\ where S(E) denotes the solution set of Problem I. The necessary and sufficient conditions for the solvability of Problem I, the expression of the general solution of Problem I and the solution of Problem II are given for two cases. For the general case, the equivalent form of conditions for the solvability of Problem I is given.
