A is a skew-symmetric real 4 x 4 matrix. Show that det A ≥ 0.
Solution
Straightforward.
Let A =
0 a b cThen det A = a2f2 + 2acdf - 2abef + b2e2 - 2bcde + c2d2.
-a 0 d e
-b -d 0 f
-c -e -f 0
At this point it is helpful to notice that a only appears with f, b with e, and c with d. So putting X = af, Y = cd, Z = be, we have that det A = X2 + Y2 + Z2 + 2XY - 2XZ - 2YZ. This easily factorizes as (X + Y - Z)2.
© John Scholes
jscholes@kalva.demon.co.uk
24 Nov 1999