Let V be a fine-dimensional inner product space and
T:V--.>V be linear . Prove if the minimal polynomial of T is m(t)=p(t)q(t) where p(t) and q(t) are relative prime polynomials , then V = ker(p(T))和ker(q(T))的直和
希望可以幫忙解惑...謝謝...
T:V--.>V be linear . Prove if the minimal polynomial of T is m(t)=p(t)q(t) where p(t) and q(t) are relative prime polynomials , then V = ker(p(T))和ker(q(T))的直和
希望可以幫忙解惑...謝謝...