1550078481-Ordinary_Differential_Equations__Roberts_

344 Ordinary Differential Equations

taneous homogeneous system of equations

C1Y11 + C2Y12 + · · · + CnYln = 0

C1Y21 + C2Y22 + · · · + CnY2n = 0

C1Ynl + C2Yn2 + · · · + CnYnn = 0

which is equivalent to (3), has a nontrivial solution- a solution in which not
all Ci 's are zero. This system may be rewritten in matrix notation as

(

Y11

Y21

Yn1

or more compactly as

(4)

Y12

Y22

Yn2

Yin) Y2n (c1C2 ) (0)^0

......

...
Ynn Cn 0

Yc=O

where Y is then x n matrix whose jth column is the vector Y1· As we stated

earlier, a homogeneous system, such as system (4), has a nontrivial solution if

and only if det Y = 0. Consequently, we have the following important results:

A set {y 1 , Y2, ... , Yn} of n constant column vectors each of size n x 1 is

linearly dependent if and only if det Y = 0 where Y is the n x n matrix

whose jth column is Yj·

Or equivalently, the set {y 1 , Y2, ... , Yn} is linearly independent if and only

if detY -=f. 0.

EXAMPLE 1 Determining Linear Dependence or

Linear Independence

Determine whether the set of vectors

is linearly dependent or linearly indep endent.