Show that the representation of T with respect to the basis {x1,x2,x3, xn} where xiÎSi (1< i < n) is an upper – triangular matrix while with respect to
S'={xn,xn-1, x1}, it is lower-triangular (Schur's theorem).
Show that the representation of T with respect to the basis {x1,x2,x3, xn} where xiÎSi (1< i < n) is an upper – triangular matrix while with respect to
S'={xn,xn-1, x1}, it is lower-triangular (Schur's theorem).
What have you been able to do on this problem so far?