Cauchy-Schwarz inequality of determinants:
for $A_{n\times k}$, $B_{n\times k}$, and $B'B$ non-singular, we have
$|A'B|^2\leq |A'A||B'B|$
I was wondering what's the sufficient and necessary conditions for the equality to hold.
I know a sufficient condition:
when $\exists C_{k\times k}$, such that $A=BC$, then the equality holds.
Is this also a necessary condition?
Thanks.
The standard argument goes as follows: Let $M=B'A(A'A)^{-1}A'B$ and $N=B'(I-A(A'A)^{-1}A')B$. Then it is easy to check that $M$ and $N$ are positive definite and that the Cauchy-Schwarz inequality is equivalent to the following (true) inequality $$ |M+N| \ge |M| $$which has equality if and only if $N$ is the zero matrix, i.e., when $(I-A(A'A)^{-1}A')B=0$, or $B=AC$ where $C=(A'A)^{-1}A'B$. This shows that your inequality is an equality if and only if $B=AC$ where $C$ is invertible.
