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Differential Equations Sections 4.1 Differential Equations

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Title: Differential Equations Sections 4.1 Differential Equations


1
Differential Equations
  • Sections 4.1

2
Differential Equations
  • Recall
  • A general solution is a family of solutions
  • defined on some interval I that contains
  • all solutions of the DE that are defined
  • on I.
  • In this chapter we will discuss finding
  • general solutions of LDE of higher order
  • than 1. We must investigate LDEs.

3
Differential Equations
  • For LDE We will distinguish between
  • Initial-Value and
  • Boundary-Value Problems

4
Differential Equations
  • A LDE n-th order Initial Value Problem
  • Solve
  • Subject to y(x0) y0, y(x0) y1 , , y(n-1)
    (x0) yn-1

5
Differential Equations
  • Theorem 4.11
  • Existence of a Unique Solution
  • Let and g(x)
    be
  • continuous on an interval I and let
  • an(x) ? 0 for every x in this interval. If x0
  • is any point in I, then the solution y(x) of
  • the IVP exists on I and is unique.

6
Differential Equations
  • Example 1 The given family of functions
  • is the general solution of the DE on the
  • indicated interval. Find a member of the
  • family that is a solution of the IVP.

7
Differential Equations
  • Example 2 Given that y c1 c2x2 is a
  • two-parameter family of solutions of
  • xy y 0 on the interval (-8, 8), show
  • that constants c1 and c2 cannot be found
  • so that a member of the family satisfies
  • the initial conditions y(0) 0, y(0) 1.
  • Explain why this does not violate Thm. 4.1.1

8
Differential Equations
  • A LDE n-th order Boundary Value
  • Problem
  • Solve
  • Subject to the dependent variable y or its
    derivatives are specified at different points.

9
Differential Equations
  • So a 2nd order Boundary-Value Problem
  • Solve
  • Subject to y(a) y0, y(b) y1
  • Or y(a) y0, y(b) y1
  • Or y(a) y0, y(b) y1
  • Or y(a) y0, y(b) y1

10
Differential Equations
  • In the case of BVP, even if the conditions
  • are satisfied as in Thm. 4.1.1, we may still
  • have many, one or no solutions.

11
Differential Equations
  • The given two-parameter family is a
  • solution of the indicated DE on the
  • interval (-8, 8). Determine whether a
  • member of the family can be found that
  • satisfies the boundary conditions.

12
Differential Equations
  • Def A linear n-th order DE of the form
  • is homogeneous, and
  • is non-homogeneous with g(x) ? 0.

13
Differential Equations
  • To solve a nonhomogeneous equation like
  • in (2), we must solve the associated
  • homogeneous equation (1).
  • We will state for the remainder of the section
    that
  • -The coefficient functions ai(x) for each i, and
    g(x) are continuous and
  • - an(x) ?0 for every x in the interval.

14
Differential Equations
  • Superposition Principle Homogeneous Eq.
  • Let y1, y2, , yn be solutions of the
  • homogeneous nth-order DE (1) on an
  • interval I. Then the linear combination
  • y c1 y1(x)c2 y2(x) cn yn(x)
  • where ci are arbitrary constants, is also a
  • solution on the interval.

15
Differential Equations
  • Corollarys
  • A constant multiple y c1y1(x) of a solution
    y1(x) of a homogeneous LDE is also a solution.
  • A homogeneous LDE always possesses the trivial
    solution y 0.

16
Differential Equations
  • Def Linear Dependence/Independence
  • A set of functions f1(x), f2(x), , fn(x) is
  • said to be linearly dependant on an
  • interval I if there exist constants
  • c1, c2, , cn, not all zero, such that
  • c1f1(x) c2f2(x) cnfn(x)0
  • For every x in the interval. If the set of
  • fn. Is not linearly dependant then its
  • linearly independent.

17
Differential Equations
  • Linear dependence means for example for
  • a set containing two functions that one is
  • a constant multiple of the other.
  • Note that f(x) x and g(x) sin(x) are
  • linearly independent, since neither is
  • simply a constant multiple of the other.

18
Differential Equations
  • Theorem 4.1.3 Criterion for Linearly
  • Independent Solutions.
  • Let y1, y2, , yn be n solutions of the
  • homogeneous liner nth-order DE (1) on an
  • interval I. Then the set of solutions is
  • linearly independent on I iff
  • W(y1, y2, , yn ) ? 0 for every x in the
  • interval.

19
Differential Equations
  • What is the W(f1, f2, , fn)?
  • If f1, f2, , fn are fn such that each has
  • at least n-1 derivatives. The determinant
  • W(f1, f2, , fn)
  • The Wronskian of the functions.

20
Differential Equations
  • Recall the determinant computation

21
Differential Equations
  • Example Determine whether the given
  • set of functions is linearly independent on
  • the interval (-8,8).
  • f(x) x, g(x) x3 , h(x) 3x3 6x
  • f(x) 7, g(x) sinx, h(x) cosx

22
Differential Equations
  • Def Any set y1, y2, , yn of n linearly
  • independent solutions of the homogeneous
  • linear nth-order DE (1) on an interval I is
  • said to be a fundamental set of solutions
  • on the on the interval.
  • Thm. 4.1.4 There exists a f.s. of solutions
  • for the homogeneous linear nth-order DE
  • (1) on an interval I.

23
Differential Equations
  • Theorem 4.1.5 Let y1, y2, , yn be a
  • fundamental set of solutions of (1) on an
  • interval I. Then the general solution of (1)
  • on the interval I is
  • y c1f1(x) c2f2(x) cnfn(x),
  • where ci are arbitrary constants.

24
Differential Equations
  • Example Verify the given functions form
  • a fundamental set of solutions of the
  • differential equation on the indicated
  • interval. Form the general solution.

25
Differential Equations
  • Reference
  • Differential Equations
  • With Boundary-Value Problems
  • Zill Cullen
  • Seventh Edition
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