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Higher Order
Linear
Differential
Equations
Math 240
Linear DE
Linear
differential
operators
Familiar stuff Higher Order Linear Differential Equations
Example
Homogeneous
equations
Math 240 — Calculus III
Summer 2015, Session II
Tuesday, July 28, 2015
Higher Order Agenda
Linear
Differential
Equations
Math 240
Linear DE
Linear
differential
operators
Familiar stuff
Example 1. Linear differential equations of order n
Homogeneous Linear differential operators
equations
Familiar stuff
An example
2. Homogeneous constant-coefficient linear differential
equations
Higher Order Introduction
Linear
Differential
Equations
Math 240
Linear DE
Linear Wenowturn our attention to solving linear differential
differential
operators
Familiar stuff equations of order n. The general form of such an equation is
Example
Homogeneous a (x)y(n) +a (x)y(n−1) +···+a (x)y′ +a (x)y = F(x),
equations 0 1 n−1 n
where a ,a ,...,a , and F are functions defined on an
0 1 n
interval I.
The general strategy is to reformulate the above equation as
Ly =F,
where L is an appropriate linear transformation. In fact, L will
be a linear differential operator.
Higher Order Linear differential operators
Linear
Differential
Equations
Math 240 Recall that the mapping D : Ck(I) → Ck−1(I) defined by
Linear DE D(f)=f′ is a linear transformation. This D is called the
Linear derivative operator. Higher order derivative operators
differential
operators Dk : Ck(I) → C0(I) are defined by composition:
Familiar stuff
Example k k−1
Homogeneous D =D◦D ,
equations so that
dkf
Dk(f) = .
dxk
A linear differential operator of order n is a linear
combination of derivative operators of order up to n,
L=Dn+a Dn−1+···+a D+a ,
1 n−1 n
defined by
Ly =y(n) +a y(n−1) +···+a y′ +a y,
1 n−1 n
where the a are continous functions of x. L is then a linear
i
transformation L : Cn(I) → C0(I). (Why?)
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