is called the characteristic function of the matrix A. Concerning this function, we have the following famous theorem.
Theorem 2.62. (Cayley-Hamilton Theorem).
Every square matrix A satisfies its characteristic equation ϕ (A) = 0.
Proof. The characteristic matrix of A is A – λIn. Since the elements of A – λIn are at most of the first degree in λ, the elements, (cofactor) of the adjoint matrix of A – λIn are of degree utmost n – 1 in λ. Therefore, we may represent adj (A – λIn) as a matrix polynomial
where Bk is the matrix whose elements are the coefficients of λk in the corresponding elements of adj(A – λIn). But
Substituting ...
Get Engineering Mathematics, Volume II, Second Edition now with the O’Reilly learning platform.
O’Reilly members experience books, live events, courses curated by job role, and more from O’Reilly and nearly 200 top publishers.
