非线性分析报告作业第2次(硕士博士非线性分析报告)
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1. For the following dynamical systems
1)''
30x
x x ++= 2)''
2(1),(1)3x x x xy y y y xy =--=--
a) Find all fixed points and classify them. b) Sketch the phase space portrait. Solution for 1):''
30x
x x ++=
Set 121
,y x y y '==. Then, the equation becomes to , 1
23
2
11y y y y y '=⎧⎨'=--⎩ Set vector variable z, we can write
()z f z =r r &, where 12y z y ⎡⎤=⎢⎥⎣⎦
r 213211()y y f z f y y y ⎡⎤⎡⎤==⎢⎥⎢⎥--⎣⎦⎣⎦r
There is only fixed point 00z ⎡⎤=⎢⎥⎣⎦
r % The Jacobian matrix 2
10
1310Df y ⎡⎤=⎢⎥--⎣⎦ Jacobian matrix for linearized system at the fixed point,
()
0110Df y ⎡⎤=⎢⎥
-⎣⎦
r % Eigenvalues for this system are 12i λ=±, so they have zero real part and the method of linearization cannot decide about the stability.
Solution for 2):'
'
2(1),(1)3x
x x xy y y y xy =--=--
Jacobian matrix :243123x y x A y
y x ---⎡⎤
=⎢⎥---⎣⎦ Jacobian matrix for linearized system at the fixed point 00⎡⎤⎢⎥⎣⎦
is
2001⎡⎤⎢⎥⎣⎦
Eigenvalues for this system are 122,1λ=, repelling node, which is unstable.
2. Given the system
'''30x x x x +++=
Show that the equilibrium (0, 0) is globally asymptotically stable. Solution :
Set 121
,y x y y '==. Then, the equation becomes to , 1
23
2
211y y y y y y '=⎧⎨'=---⎩ Set vector variable z, we can write
()z f z =r r &, where 12y z y ⎡⎤=⎢⎥⎣⎦
r 213
2211()y y f z f y y y y ⎡⎤⎡⎤==⎢⎥⎢⎥---⎣⎦⎣⎦r There is only fixed point 00z ⎡⎤=⎢⎥⎣⎦
r % The Jacobian matrix 2
10
1311Df y ⎡⎤=⎢⎥---⎣⎦ Jacobian matrix for linearized system at the fixed point,
()
0111Df y ⎡⎤=⎢⎥
--⎣⎦
r % Eigenvalues for this system are 120.50.866i λ=-±, so they have negative real parts. Thus, it is stable.
3. For a real number c, define the one-parameter family
()()(23),a f x x a x a x c =--++ for what values of c is there a
bifurcation in this family? Describe the bifurcations and list the bifurcation points (a, x), and Sketch the bifurcation diagram. Solution:
Suppose 0a =. Set ()212f x x =,()2f x x c =--.
()()()120a f x f x f x =⇒=
When 1
8c =, there is a bifurcation in ()a f x .
Bifurcation points: 10,4⎛
⎫- ⎪⎝
⎭
4. Show that the one parameter system
''2'2'()0x x x x x μ++-+=
undergoes a Hopf bifurcation at μ = 0. Plot the phase portraits and sketch the bifurcation diagram. Solution:
Set 12,x x x x '==, the corresponding state-space equations is
23
112221
22
x x x x x x x x μ⎧⎪⎨--+⎪⎩-'='= Solve the equations
23
1122220
x x x x x x μ⎧⎪⎨⎪⎩=--+=- Fixed points are obtained as (0,0).
Jacobian matrix and Eigenvalues are
1,2,011λμ⎡⎤⎢
⎥⎢⎥⎣⎦
=
=-A
When 0μ=, there is an node center. The phase space portrait is shown next