176 Ordinary Differential Equations
THEOREM 4.3 Let an(x), an-i(x), ... , a 1 (x), ao(x) be continuous on
the interval I and let an ( x) -=f. 0 for all x E I. The functions Y1 ( x), Y2 ( x),... , Yn(x) are linearly independent solutions on the interval I of the n-th
order homogeneous linear differential equation(15) an(x)y(n)(x) +an-1(x)y(n-l)(x) + · · · +a1(x)y(ll(x) +ao(x)y(x) = 0,
if and only if y 1 (x ), y 2 (x),... , Yn(x) are solutions of (15) on I and the Wron-skian W(y1, y2, ... , Yn, x) -=f. 0 for some x EI.
Proof: The "if" portion of this theorem is a special case of Theorem 4.2 in
which the functions y 1 (x), y 2 (x), ... , Yn(x) a re all known to be solutions of
the same n-th order homogeneous linear differential equation.
We prove the "only if" portion of this theorem by contradiction. Thus, weassume that the functions y 1 ( x), Y2 ( x), ... , Yn ( x) are linearly independent
on the interval I and that the Wronskian W (Y1, Y2, ... , Yn, x) = 0 for all
x E I. Choose any a E I. By the theorem from linear algebra stated earlier,since W(y1, Y2, ... , Yn, a) = 0 there exists a nonzero solution to the following
linear homogeneous system of n equations in the n unknowns c1, c2, ... , Cn
(16)^0Let the nonzero solution be denoted by k 1 , k 2 , ... , kn and consider the linear
combination(17)Since Y1 (x), Y2(x), ... , Yn(x) are solutions of (15) on I , by the superposition
theorem y(x) is a solution of (15) on I. Differentiating (17) n - 1 times
and then evaluating (17) and each derivative at x = a, we find from equa-
tions (16) that y(x) satisfies the conditions(18) y(a) = 0, y(ll(a) = 0, ... , y(n-l)(a) = 0.
That is, y(x) satisfies the initial value problem consisting of the differen-
tial equation (15) and the initial conditions (18). But by the existence and
uniqueness theorem the unique solution of this initial value problem is the