Necessary and Sufficient Condition for Quadratic Functional to be Positive Definite

Theorem
Suppose:


 * $\forall x \in \closedint a b: \map P x > 0$

Then the quadratic functional:


 * $\displaystyle \int_a^b \paren {P h'^2 + Q h^2} \rd x$

is positive definite for all $\map h x$:


 * $\map h a = \map h b = 0$

the interval $\closedint a b$ contains no points conjugate to $a$.

Necessary Condition
Let there be $\map \omega x$ :


 * $\map \omega x \in C^1 \closedint a b$.

Then:

Let $\omega$ be a solution to the following equation:


 * $\map P {Q + \omega'} = \omega^2$

Then:

In other words:

Suppose that:


 * $h' + \dfrac \omega P h = 0$

By Existence-Uniqueness Theorem for First-Order Differential Equation:


 * $\forall x \in \closedint a b: \map h a = 0 \implies \map h x = 0$

This implies an infinite number of conjugate points.

By assumption, there are no conjugate points.

Hence:


 * $\forall x \in \openint a b: \map h x \ne 0$

and:


 * $P \paren {h' + \dfrac {\omega h} P}^2 > 0$

Thus, a definite integral of positive definite function is positive definite.

Sufficient Condition
Consider the functional:


 * $\forall t \in \closedint 0 1: \displaystyle \int_a^b \sqbrk {t \paren {P h^2 + Q h'^2} + \paren {1 - t} h'^2} \rd x$

By assumption:


 * $\displaystyle \int_a^b \paren { Ph'^2 + Q h^2} \rd x > 0$

Since there are no conjugate points in $\closedint a b$:


 * $\forall x \in \openint a b: \map h x > 0$

Hence:


 * $\forall t \in \closedint 0 1: \displaystyle \int_a^b \sqbrk {t \paren {P h'^2 + Q h^2} + \paren {1 - t} h'^2} \rd x > 0$

The corresponding Euler's Equation is:


 * $2 Q h t - \map {\dfrac \d {\d x} } {2 t P h'+ 2 h' \paren {1 - t} } = 0$

which is equivalent to:


 * $-\map {\dfrac \d {\d x} } {\paren {t P + \paren {1 - t} } h'} + t Q h = 0$

Let $\map h {x, t}$ be a solution to this such that:


 * $\forall t \in \closedint 0 1: \map h {a, t} = 0, \map {h_x} {a, t} = 1$

Suppose there exists a conjugate point $\tilde a$ to $a$ in $\closedint a b$.

In other words:


 * $\exists \tilde a \in \closedint a b: \map h {\tilde a, 1} = 0$

By definition, $a \ne \tilde a$.

$\tilde a = b$.

Then by the lemma 1:


 * $\displaystyle \int_a^b \paren {P h'^2 + Q h^2} \rd x = 0$

This contradicts the assumption.

Therefore, $\tilde a \ne b$.

Thus, for $t = 1$, any other conjugate point may reside only in $\openint a b$.

Consider the following set of all points $\tuple {x, t}$:


 * $\set {\tuple {x, t}: \paren {\forall x \in \closedint a b} \paren {\forall t \in \closedint 0 1} \paren {\map h {x, t} } = 0}$

If it is non-empty, it represents a curve $\paren \star$ in $x - t$ plane, such that $\map {h_x} {x, t} \ne 0$.

By the Implicit Function Theorem, $\map x t$ is continuous.

By hypothesis, $\tuple {\tilde a, 1}$ lies on this curve.

Suppose the curve starts at this point.

The curve can terminate either inside the rectangle or its boundary.

If $\paren \star$ terminates inside the rectangle $\closedint a b \times \closedint 0 1$, it implies that there is a jump discontinuity in the value of $h$.

Therefore, it contradicts the continuity of $\map h {x, t}$ in the interval $t \in \closedint 0 1$.

If $\paren \star$ intersects the line segment $x = b, 0 \le t \le 1$, then by lemma 2 the considered functional vanishes.


 * This contradicts positive definiteness of the functional for all $t$.

If $\paren \star$ intersects the segment $a \le x \le b, t = 1$, then:
 * $\exists t_0: \paren {\map h {x, t_0} = 0} \land \paren {\map {h_x} {x, t_0} = 0}$

If $\paren \star$ intersects $a \le x \le b, t = 0$, then Euler's equation reduces to $h'' = 0$ with solution $h = x - a$, which vanishes only for $x = a$.

If $\paren \star$ intersects $x = a, 0 \le t \le 1$, then $\exists t_0:\map {h_x} {a, t_0} = 0$

By Proof by Cases, no such curve exists.

Thus, the point $\tuple {\tilde a, 1}$ does not exist, since it belongs to this curve.

Hence, there are no conjugate points in the interval $\closedint a b$.