1540470959-Boundary_Value_Problems_and_Partial_Differential_Equations__Powers

Chapter 0 Ordinary Differential Equations 9

Now collect terms in the derivatives ofv. The preceding equation becomes

u 1 v′′+

(

2 u′ 1 +k(t)u 1

)

v′+

(

u′′ 1 +k(t)u′ 1 +p(t)u 1

)

v= 0.

However,u 1 is a solution of Eq. (24), so the coefficient ofvis 0. This leaves

u 1 v′′+

(

2 u′ 1 +k(t)u 1

)

v′= 0 , (25)

which is a first-order linear equation forv′. Thus, a nonconstantvcan be
found, at least in terms of some integrals.

Example.
Consider the equation
(
1 −t^2

)

u′′− 2 tu′+ 2 u= 0 , − 1 <t< 1 ,

which hasu 1 (t)=tas a solution. By assuming thatu 2 =v·tand substituting,
we obtain
(
1 −t^2

)

(v′′t+ 2 v′)− 2 t(v′t+v)+ 2 vt= 0.

After collecting terms, we have
(
1 −t^2

)

tv′′+( 2 − 4 t^2 )v′= 0.

From here, it is fairly easy to find

v′′

v′=

4 t^2 − 2

t( 1 −t^2 )=

− 2

t +

1

1 −t−

1

1 +t

(using partial fractions), and then

lnv′=−2ln(t)−ln( 1 −t)−ln( 1 +t).

Finally, each side is exponentiated to obtain

v′=^1

t^2 ( 1 −t^2 )

=^1

t^2

+^1 /^2

1 −t

+^1 /^2

1 +t

,

v=−

1

t+

1

2 ln

∣∣

∣∣^1 +t

1 −t

∣∣

∣∣.

D. Higher-Order Equations

Linear homogeneous equations of order higher than 2 — especially order 4 —
occur frequently in elasticity and fluid mechanics. A general,nth-order homo-
geneous linear equation may be written

u(n)+k 1 (t)u(n−^1 )+···+kn− 1 (t)u(^1 )+kn(t)u= 0 , (26)