the super stability of third order linear ordinary differential homogeneous equation with boundary...
DESCRIPTION
The stability problem is a fundamental issue in the design of any distributed systems like local area networks, multiprocessor systems, distribution computation and multidimensional queuing systems. In Mathematics stability theory addresses the stability solutions of differential, integral and other equations, and trajectories of dynamical systems under small perturbations of initial conditions. Differential equations describe many mathematical models of a great interest in Economics, Control theory, Engineering, Biology, Physics and to many areas of interest. In this study the recent work of Jinghao Huang, Qusuay. H. Alqifiary, and Yongjin Li in establishing the super stability of differential equation of second order with boundary condition was extended to establish the super stability of differential equation third order with boundary condition. Dawit Kechine Menbiko "The Super Stability of Third Order Linear Ordinary Differential Homogeneous Equation with Boundary Condition" Published in International Journal of Trend in Scientific Research and Development (ijtsrd), ISSN: 2456-6470, Volume-3 | Issue-6 , October 2019, URL: https://www.ijtsrd.com/papers/ijtsrd29149.pdf Paper URL: https://www.ijtsrd.com/mathemetics/applied-mathematics/29149/the-super-stability-of-third-order-linear-ordinary-differential-homogeneous-equation-with-boundary-condition/dawit-kechine-menbikoTRANSCRIPT
International Journal of Trend in Scientific Research and Development (IJTSRD)Volume 3 Issue 6, October 2019
@ IJTSRD | Unique Paper ID – IJTSRD29149
The Super Stability of Third Order Linear Ordinary
Homogeneous Equation
Department of Mathematics, College
ABSTRACT
The stability problem is a fundamental issue in the design of any distributed
systems like local area networks, multiprocessor systems, distribution
computation and multidimensional queuing systems. In Mathematics
stability theory addresses the stability solutions of differential, integral and
other equations, and trajectories of dynamical systems under small
perturbations of initial conditions. Differential equations describe many
mathematical models of a great interest in Economics, Control theo
Engineering, Biology, Physics and to many areas of interest.
In this study the recent work of Jinghao Huang, Qusuay.
Yongjin Li in establishing the super stability of differential equation of
second order with boundary condition was
stability of differential equation third order with boundary condition.
KEYWORDS: supper stability, boundary conditions,
INTRODUCTION
In recent years, a great deal of work has been done on
various aspects of differential equations of third order.
Third order differential equations describe many
mathematical models of great iterest
biology and physics. Equation of the form
( ) ( ) ( ) ( )x a x x b x x c x x f t′′′ ′′ ′+ + + = arise in the study of
entry-flow phenomena, a problem of hydrodynamics
which is of considerable importance in many branches of
engineering.
There are different problems concerning third order
differential equations which have drawn the attention of
researchers throughout the world. [17]
In mathematics stability theory addresses the st
solutions of differential equations, Integral equations,
including other equations and trajectories of dynamical
systems under small perturbations. Following this,
stability means that the trajectories do not change too
much under small perturbations [7].The stability problem
is a fundamental issue in the design of any distributed
systems like local area networks, multiprocessor systems,
mega computations and multidimensional queuing
systems and others. In the field of economics, stability is
achieved by avoiding or limiting fluctuations in
production, employment and price.
International Journal of Trend in Scientific Research and Development (IJTSRD)2019 Available Online: www.ijtsrd.com e
29149 | Volume – 3 | Issue – 6 | September
f Third Order Linear Ordinary
Homogeneous Equation with Boundary Condition
Dawit Kechine Menbiko
f Mathematics, College of Natural and Computational Science, Wachemo University, Ethiopia
The stability problem is a fundamental issue in the design of any distributed
systems like local area networks, multiprocessor systems, distribution
computation and multidimensional queuing systems. In Mathematics
tability solutions of differential, integral and
other equations, and trajectories of dynamical systems under small
perturbations of initial conditions. Differential equations describe many
mathematical models of a great interest in Economics, Control theory,
Engineering, Biology, Physics and to many areas of interest.
In this study the recent work of Jinghao Huang, Qusuay. H. Alqifiary, and
in establishing the super stability of differential equation of
second order with boundary condition was extended to establish the super
stability of differential equation third order with boundary condition.
boundary conditions, Intial conditions
How to cite this paper
Menbiko "The Super Stability of Third
Order Linear Ordinary Differential
Homogeneous Equation with Boundary
Condition" Published
in International
Journal of Trend in
Scientific Research
and Development
(ijtsrd), ISSN: 2456
6470, Volume
Issue-6, October
2019, pp.697
https://www.ijtsrd.com/papers/ijtsrd29
149.pdf
Copyright © 2019 by author(s) and
International Journal of Trend in
Scientific Research and Development
Journal. This is an Open Access article
distributed under
the terms of the
Creative Commons
Attribution License (CC BY 4.0)
(http://creativecommons.org/licenses/b
y/4.0)
In recent years, a great deal of work has been done on
various aspects of differential equations of third order.
order differential equations describe many
in engineering,
biology and physics. Equation of the form
arise in the study of
a problem of hydrodynamics
considerable importance in many branches of
There are different problems concerning third order
differential equations which have drawn the attention of
In mathematics stability theory addresses the stability of
solutions of differential equations, Integral equations,
including other equations and trajectories of dynamical
systems under small perturbations. Following this,
stability means that the trajectories do not change too
The stability problem
is a fundamental issue in the design of any distributed
systems like local area networks, multiprocessor systems,
mega computations and multidimensional queuing
systems and others. In the field of economics, stability is
ieved by avoiding or limiting fluctuations in
The stability problem in mathematics started by Poland
mathematician Stan Ulam for functional equations around
1940; and the partial solution of Hyers to the Ulam’s
problem [2] and [20].
In 1940, Ulam [21] posed a problem concerning the
stability of functional equations:
“Give conditions in order for a linear function near an
approximately linear function to exist.”
A year later, Hyers answered to the problem of Ulam for
additive functions defined on Banach space:
be real Banach spaces andɛ � 1 2:f X X→
( ) ( ) ( ) ,f x y f x f y x y X+ − − ≤ ∈There exists a unique additive function
with the property
( ) ( )f x A x x Xε− ≤ ∈
Thereafter, Rassias [14] attempted to solve the stability
problem of the Cauchy additive functional equations in
more general setting. A generalization of Ulam’s problem
is recently proposed by replacing functional equations
with differential equations
International Journal of Trend in Scientific Research and Development (IJTSRD)
e-ISSN: 2456 – 6470
6 | September - October 2019 Page 697
f Third Order Linear Ordinary Differential
ith Boundary Condition
Computational Science, Wachemo University, Ethiopia
How to cite this paper: Dawit Kechine
Menbiko "The Super Stability of Third
Order Linear Ordinary Differential
Homogeneous Equation with Boundary
Condition" Published
in International
Journal of Trend in
Scientific Research
and Development
(ijtsrd), ISSN: 2456-
6470, Volume-3 |
6, October
2019, pp.697-709, URL:
https://www.ijtsrd.com/papers/ijtsrd29
Copyright © 2019 by author(s) and
International Journal of Trend in
Scientific Research and Development
Journal. This is an Open Access article
distributed under
the terms of the
Commons
Attribution License (CC BY 4.0)
http://creativecommons.org/licenses/b
The stability problem in mathematics started by Poland
mathematician Stan Ulam for functional equations around
1940; and the partial solution of Hyers to the Ulam’s
In 1940, Ulam [21] posed a problem concerning the
stability of functional equations:
“Give conditions in order for a linear function near an
approximately linear function to exist.”
A year later, Hyers answered to the problem of Ulam for
additive functions defined on Banach space: let �� and ��
� 0. Then for every function
Satisfying
1( ) ( ) ( ) ,f x y f x f y x y Xε+ − − ≤ ∈
exists a unique additive function 1 2:A X X→
1f x A x x X− ≤ ∈
Thereafter, Rassias [14] attempted to solve the stability
problem of the Cauchy additive functional equations in
more general setting. A generalization of Ulam’s problem
is recently proposed by replacing functional equations
with differential equations ( )( , , ,... ) 0nf y y yϕ ′ = and
IJTSRD29149
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has the Hyers-Ulam stability if for a given 0ε > and a
function y such that
( )( ), , ,... nf y y yϕ ε′ ≤
There exists a solution 0y of the differential equation
such that
0( ) ( ) ( )y t y t k ε− ≤ And 0
lim ( ) 0kε
ε→
=
Those previous results were extended to the Hyers-Ulam
stability of linear differential equations of first order and
higher order with constant coefficients in [8, 18] and in
[19] respectively.
Rus investigated the Hyers-Ulam stability of differential
and integral equations using the Granwall lemma and the
technique of weakly Picard operators [15, 16].
Miura et al [13] proved the Hyers-Ulam stability of the
first-order linear differential equations
'( ) ( ) ( ) 0y t g t y t+ = ,
Where ( )g t is a continuous function, while Jung (4)
proved the Hyers-Ulam stability of differential equations
of the form
( ) '( ) ( )t y t y tϕ =
Motivation of this study comes from the work of Li [5]
where he established the stability of linear differential
equations of second order in the sense of the Hyers and
Ulam.
'y yλ=
Li and Shen [6] proved the stability of non-homogeneous
linear differential equation of second order in the sense of
the Hyers and Ulam
'' ( ) ' ( ) ( ) 0y p x y q x y r x+ + + =
While Gavaruta et al [1] proved the Hyers- Ulam stability
of the equation
'' ( ) ( ) 0y x y xβ+ =
with boundary and initial conditions.
The recently, introduced notion of super stability [10,11,12,13] is utilized in numerous applications of the
automatic control theory such as robust analysis, design of
static output feedback, simultaneous stabilization, robust
stabilization, and disturbance attenuation.
Recently, Jinghao Huang, Qusuay H. Alqifiary, Yongjin Li[3]
established the super stability of differential equations of
second order with boundary conditions or with initial
conditions as well as the super stability of differential
equations of higher order in the form ( ) ( ) ( ) ( ) 0ny x x y xβ+ = with initial conditions,
( 1)( ) '( ) ... ( ) 0ny a y a y a−= = = =
This study aimed to extend the super stability of second
order to the third order linear ordinary differential
homogeneous equations with boundary condition.
Main result
Super stability with boundary condition
Definition: Assume that for any function [ , ]ny c a b∈ ,if
y satisfies the differential inequalities
( )( ), , ',..., .....(1)nf y y yϕ ε≤ K
for all [ ], x a b∈ and for some 0ε ≥ with boundary
conditions, then either y is a solution of the differential
equation ( )( , , ',..., ) 0nf y y yϕ = …… ……(2)
or ( )y x ≤ kε for any [ ],x a b∈ , where k is a
constant. Then, we say that (2) has super stability with
boundary conditions.
Preliminaries
Lemma 1[10]. Let2[ , ]y c a b∈ , ( ) 0 ( )y a y b= = ,then
max ( ) 2
( ) max ''( ) .8
b ay x y x
−≤
Proof
Let M = [ ]{ }max ( ) : ,y x x a b∈ Since
( ) 0 ( )y a y b= = , there exists 0 ( , )x a b∈ such that
( )0 .y x M= By Taylor’s formula, we have
20 0 0 0
''( )( ) ( ) '( )( ) ( ) ,
2!
yy a y x y x x a x a
δ= + − + −
20 0 0 0
''( )( ) ( ) '( )( ) ( )
2!
yy b y x y x b x b x
η= + − + − ,
Where δ , η ( ),a b∈
Thus
( )2
0
2''( ) ,
My
x aδ =
−
( )2
0
2''( )
My
b xη =
−
In the case( )
0 ,2
a bx a
+ ∈
, we have
( ) ( ) ( )2 2 2
0
2 2 8
4
M M M
x a b a b a≥ =
− − −
In the case 0 ,2
a bx b
+ ∈ , we have
( ) ( ) ( )2 2 2
0
2 2 8
4
M M M
b x b a b a≥ =
− − −
So,
( ) ( )2 2
8 8max ( ) max ( )
My x y x
b a b a′′ ≥ =
− −
Therefore, max( )2
( ) max ''( )8
b ay x y x
−≤
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In (2011) the three researchers Pasc Gavaruta, Soon-Mo,
Jung and Yongjin Li, investigate the Hyers-Ulam stability of
second order linear differential equation
''( ) ( ) ( ) 0y x x y xβ+ = ………….. (3)
with boundary conditions ( ) ( ) 0y a y b= =
where, [ ] [ ]2 , , ( ) , ,y c a b x c a b a bβ∈ ∈ −∞ < < < +∞
Definition: We say (3) has the Hyers-Ulam stability with
boundary conditions
( ) ( ) 0y a y b= = if there exists a positive constant Kwith the following property:
For every [ ]20, , ,y c a bε > ∈ if
''( ) ( ) ( )y x x y xβ ε+ ≤ ,
And ( ) ( ) 0y a y b= = , then there exists some
[ ]2 ,z c a b∈ satisfying
''( ) ( ) ( ) 0z x x z xβ+ =
And ( ) 0 ( )z a z b= = , such that ( ) ( )y x z x Kε− <
Theorem 1[1]. Consider the differential equation
''( ) ( ) ( ) 0y x x y xβ+ = --------------------- (4)
With boundary conditions ( ) ( ) 0y a y b= =
Where [ ] [ ]2 , , ( ) , ,y c a b x c a b a bβ∈ ∈ −∞ < < < +∞
If
( )2
8max ( )x
b aβ <
−
then the equation (4) above has the super stability with
boundary condition
( ) ( ) 0y a y b= =
Proof:
For every [ ]20, ,y C a bε > ∈, if
''( ) ( ) ( )y x x y xβ ε+ ≤ and ( ) 0 ( )y a y b= =
Let M = { } [ ]max ( ) : ,y x x a b∈ , since ( ) 0 ( )y a y b= = ,
there exists 0 ( , )x a b∈
Such that 0( )y x = M . By Taylor formula, we have
20 0 0 0
''( )( ) ( ) '( )( ) ( ) ,
2!
yy a y x y x x a x a
δ= + − + −
20 0 0 0
''( )( ) ( ) '( )( ) ( ) ,
2!
yy b y x y x b x b x
η= + − + −
Where ( ), ,a bδ η ∈
Thus
( )2
0
2''( ) ,
My
x aδ =
−
( ) 20
2''
( )
My
x bη =
−
On the case 0
( ),
2
a bx a
+ ∈ , we have
22 20
2 2 8( )( ) ( )
4
M M M
b ax a b a≥ =
−− −
On the case 0
( ),
2
a bx b
+ ∈ we have
22 20
2 2 8( )( ) ( )
4
M M M
b ab x b a≥ =
−− −
So max2 2
8 8''( ) ( )
( ) ( )
My x max y x
b a b a≥ =
− −
Therefore
2( )( ) ''( )
8
b amax y x max y x
−≤
Thus 2( )
( ) ''( ) ( ) ( ) ( ) ( )8
b amax y x max y x x y x max x max y xβ β−≤ − +
2 2( ) ( )max ( ) max ( )
8 8
b a b ax y xε β− −≤ +
Let ( )
( )
2
2
8 1 max ( )8
b ak
b axβ
−=
−−
Obviously, 0( ) 0z x = is a solution of
''( ) ( ) ( ) 0y x x y xβ− = with the Boundary conditions
( ) 0 ( )y a y b= = .
0( ) ( )y x z x Kε− ≤
Hence the differential equation ''( ) ( ) ( ) 0y x x y xβ+ =
has the super stability with boundary condition
( ) 0 ( )y a y b= =
In (2014) the researchers J. Huang, Q. H. Aliqifiary, Y. Li
established the super stability of the linear differential
equations.
''( ) ( ) '( ) ( ) ( ) 0y x p x y x q x y x+ + =
With boundary conditions ( ) 0 ( )y a y b= =
Where
[ ] [ ] [ ]2 1 0, , , , , ,y c a b p c a b q c a b a b∈ ∈ ∈ −∞ < < < +∞
Then the aim of this paper is to investigate the super
stability of third-order linear differential homogeneous
equations by extending the work of J. Huang, Q. H.
Aliqifiary and Y. Li using the standard procedures of them.
Lemma( 2) .Let [ ]3 ,y c a b∈ and ( ) 0 ( )y a y b= = , then
( )3
max ( ) max '''( )48
b ay x y x
−≤
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Proof
Let [ ]{ }max ( ) : ,M y x x a b= ∈ since ( ) 0 ( )y a y b= = there exists:
( )0 ,x a b∈ Such that 0( )y x M=
By Taylor’s formula we have
( ) ( )2 300 0 0 0 0
''( ) '''( )( ) ( ) '( )( ) ,
2! 3!
y x yy a y x y x x a x a x a
δ= + − + − + −
2 300 0 0 0 0
''( ) '''( )( ) ( ) '( )( ) ( ) ( ) ,
2! 3!
y x yy b y x y x b x b x b x
η= + − + − + −
( ) ( )2 300 0 0 0 0
''( ) '''( )( ) ( ) '( ) ( ) ,
2! 3!
y x yy a y x y x x a x a x a
δ⇒ ≤ + − + − + −
And 2 30
0 0 0 0 0
''( ) '''( )( ) ( ) '( ) ( ) ( ) ( ) ,
2! 3!
y x yy b y x y x b x b x b x
η⇒ ≤ + − + − + −
Where ( ), ,a bδ η ∈
Thus 3 3
0 0
3! 6'''( )
( ) ( )
M My
x a x aδ = =
− −
And 3 3
0 0
3! 6'''( )
( ) ( )
M My
b x b xη = =
− −
For the case 0 ,2
a bx a
+ ∈ that is 0 2
a ba x
+< ≤ ,we have
3 33 30
6 6 6 48( )( ) ( )
82
M M M M
b ax a b aa ba
≥ = =−− −+ −
And for the case 0 ,2
a bx b
+ ∈ ,that is 02
a bx b
+ ≤ < we have
( ) ( )3 3 330
6 6 6 48
( )
2 8
M M M M
b x b a b ab a≥ = =
− − −−
⇒
( ) ( )3 3
0
6 48M M
b x b a≥
− −
Thus 3 3
48 48max '''( ) max ( )
( ) ( )
My x y x
b a b a≥ =
− −
from 3
48max '''( ) max ( )
( )y x y x
b a≥
−
3( )max ( ) max '''( )
48
b ay x y x
−⇒ ≤
Theorem 2. Consider '''( ) ( ) ''( ) ( ) '( ) ( ) ( ) 0y x m x y x p x y x q x y x+ + + = ------------------ (5)
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with boundary conditions ( ) ( )a =0= y by
where [ ] [ ] [ ] [ ]3 2 0, , , , ' , , ,y c a b m c a b p c a b q c a b a b∈ ∈ ∈ ∈ − ∞ < < < +∞
If �� �� + �� �� − �
′� + �� ���
′ − 2��′ +��� − 2��� − �� �
� < ������ � -------(6)
Then (5) has the super stability with boundary conditions ( )( ) 0y a y b= =
Proof
Suppose that [ ]3 ,y c a b∈ satisfies the inequality:
'''( ) ( ) ''( ) ( ) '( ) ( ) ( )y x m x y x p x y x q x y x ε+ + + ≤ ------------ (7) for some 0ε >
Let ( )U x = '''( ) ( ) ''( ) ( ) '( ) ( ) ( )y x m x y x p x y x q x y x+ + --------- (8)
For all [ ],x a b∈ and define ( )z x by
1( )
2( ) ( )
x
a
p d
y x z x eτ τ− ∫
= --------- (9)
And by taking the first, second and third derivative of (9)
That is
121
( ) ( )2
x
a
y x z zp e p dτ τ− ′ ′= −
∫
1( )
221 1( )
2 4
x
a
p d
y x z z p zp zp eτ τ− ∫ ′′ ′′ ′ ′= − − +
1( )
22 2 31 1 1 1 1 1 1 1'''( ) ''' '' '' '
2 2 2 2 4 4 2 8
x
a
p d
y x z z p z p z p z p z p zp zpp z p zp zp eτ τ− ∫ ′ ′ ′ ′ ′′ ′ ′= − − − + − − + + + −
And by substituting (9) and its first, second and third derivatives in (8) we get
2 2 31 1 1 1 1 1 1 1( ) ''' '' '' ' ' ' ' ' '' ' '
2 2 2 2 4 4 2 8u x z z p z p z p z p z p zp zpp z p pz zp
= − − − + − − + + + − +
21 1 1'' ' ' '
2 4 2m z z p zp zp p z zp zq − − + + − +
]1
( )2
x
a
p d
eτ τ− ∫
= 2 2 31 1 1 1 1 1 1 1
''' '' '' ' ' ' ' ' '' ' '2 2 2 2 4 4 2 8
z z p z p z p z p z p zp zpp z p zp zp − − − + − − + + + − +
]2 21 1 1'' ' ' '
2 4 2mz z mp zmp zmp pz zp qz− − + + − +
1( )
2
x
a
p d
eτ τ− ∫
= 23 3 3 1 1 1 1
''' '' '' ' ' ' ' ' ' ' ''2 2 4 2 4 2 2
z mz z p z p z mp z p z p qz zp zpp zmp zp + − + − − + + + + − − +
]2 2 31 1 1
4 2 8zmp zp zp− −
1( )
2
x
a
p d
eτ τ− ∫
= [ 23 3 3''' '' ' '
2 2 4z m p z p mp p p z
+ − + − − + +
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2 2 31 1 1( '') ( ' 2 ' 2 )
2 4 8q p p pp mp mp p p + − + − + − −
]z
1( )
2
x
a
p d
eτ τ− ∫
Now choose 3
2m p= and
23 3'
4 2p p p
mp
− +=
By doing this the coefficients of ''( )z x and '( )z x will vanish.
To check whether the relation holds or not, for
23 3'
3 4 22
p p pp
p
− +=
2 23 3 3'
2 4 2p p p p⇒ = − +
23 3'
2 4p p p⇒ = −
3 3' 1
2 4p p p
⇒ = −
3 31
2 4
dpp p
dx = −
23 314
dpdx
p p⇒ =
−
using partial fraction
Since
31 14
3 31 14 4
p p p p
+ = − −
31 24
3 314
dp dxp p
+ = −
--------(*)
By integrating both sides of (*) we have
1
3 2ln ln 1
4 3p p x c− − = +
1
2ln
3 314
px c
p⇒ = +
−
2
3
31
4
xpCe
p⇒ =
−
2
3 31
4
xp Ce p
= −
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2 2
3 33
4
x xCe Cpe= −
2 2 2
3 3 33 31
4 4
x x xp Cpe Ce p Ce
+ = = +
2
3
2
331
4
x
x
Cep
Ce
=+
⇒ 3
2m p=
m =
2
3
2
3
3
2 31
4
x
x
Ce
Ce
+
Then
1( )
22 2 31 1 1''' ( '') ( ' 2 ' 2 ) ( )
2 4 8
x
a
p d
z q p p pp mp mp p p ze u xτ τ− ∫ + + − + − + − − =
Then from the inequality (7) we get 2 2 31 1 1
''' ( '') ( ' 2 ' 2 )2 4 8
z q p p pp mp mp p p z + + − + − + − − =
1 1( ) ( )
2 2( )
x x
a a
p d p d
u x e eτ τ τ τ
ε∫ ∫
≤
From the boundary condition ( ) 0 ( )y a y b= = and
1( )
2( ) ( )
x
a
p d
y x z x eτ τ− ∫
=
We have ( ) 0 ( )z a z b= =
Define 2 2 31 1 1
( ) ( '') ( ' 2 ' 2 )2 4 8
x q p p pp mp mp p pβ = + − + − + − −
Then
1 1( ) ( )
2 2'''( ) ( ) ( )
x x
a a
p d p d
z x z x u x e eτ τ τ τ
β ε∫ ∫
+ = ≤
Using lemma (2)
( )3
max ( ) max '''( )48
b az x z x
−≤
( )3
max '''( ) ( ) max max ( )48
b az x z x z xβ β
−≤ + +
( ) ( )13 3( )
2max max max ( )
48 48
x
a
p db a b ae z x
τ τ
ε β ∫− − ≤ +
Since
1( )
2max
x
a
p d
eτ τ∫
< ∞ on the interval [ ],a b
Hence, there exists a constant 0K > such that
( )z x kε≤ For all [ ],x a b∈
More over
1( )
2max
x
a
p d
eτ τ− ∫
< ∞ on the interval [ ],a b which implies that there exists a constant such that ' 0K >
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1
( ) ( )exp ( )2
x
a
y x z x p dτ τ
= −
∫
1
max exp ( ) '2
x
a
p d k kτ τ ε ε ≤ − ≤
∫
( ) 'y x k ε⇒ ≤
Then '''( ) ( ) ''( ) ( ) '( ) ( ) ( ) 0y x m x y x p x y x q x y x+ + + = has super stability with boundary conditions
( ) 0 ( )y a y b= =
Example
Consider the differential equation below
2 2
3 3
2 2
3 3
3''' '' ' 0
2 3 31 1
4 4
x x
x x
e ey y y y
e e
+ + + = + +
----------- (10)
With boundary conditions ( ) 0 ( )y a y b= =
Where [ ] [ ] [ ] [ ]2 2
3 33 2 1 0
2 2
3 3
3, , , , , ,1 , ,
2 3 31 1
4 4
x x
x x
e ey c a b c a b c a b c a b
e e
∈ ∈ ∈ ∈ + +
a b−∞ < < < +∞
If
2 2 2 2 2 2
3 3 3 3 3 3
2 2 2 2 2 2
3 3 3 3 3 3
1 1max 1 3
2 43 3 3 3 3 31 1 1 1 1 1
4 4 4 4 4 4
x x x x x x
x x x x x x
e e e e e e
e e e e e e
′′ ′ ′ + − + − + + + + + + +
( )
2 2 32 2 2 2
3 3 3 3
2 2 2 2 3
3 3 3 3
3 1 482
2 83 3 3 31 1 1 1
4 4 4 4
x x x x
x x x x
e e e e
b ae e e e
− − < − + + + +
--------- (11)
Then (10) has super stability with boundary conditions ( ) 0 ( )y a y b= =
Suppose that [ ]3 ,y c a b∈ satisfies the inequality
2 2
3 3
2 2
3 3
3
2 3 31 1
4 4
x x
x x
e ey y y y
e e
ε
′′′ ′′ ′+ + + ≤ + +
,for some 0ε > --------- (12)
Let v(x)
2 2
3 3
2 2
3 3
3
2 3 31 1
4 4
x x
x x
e ey y y y
e e
′′′ ′′ ′= + + + + +
------- (13)
For all [ ],x a b∈ and define ( )z x by
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2
3
2
3
1
2 31
4( ) ( )
xx
xa
ed
ey x z x e
τ−
+∫
= ----- (14)
2
3
2
3
12
2 33 14
2
3
1
2 31
4
xx
xa
ed
xe
x
ey z z e
e
τ−
+
∫ ′ ′= − +
2
3
2
3
21
2 2 22 33 3 3 1
42 2 2
3 3 3
1 1
2 43 3 31 1 1
4 4 4
xx
xa
ex x x
e
x x x
e e ey z z z e
e e e
−
+
′ ∫ ′′ ′′ ′= − − + + + +
' 22 2 2 2
3 3 3 3
2 2 2 2
3 3 3 3
1 1
2 23 3 3 31 1 1 1
4 4 4 4
x x x x
x x x x
e e e ey z z z z z
e e e e
′′′ ′′′ ′′ ′′ ′ ′= − − − + − + + + +
2 2 2 2
3 3 3 3
2 2 2 2
3 3 3 3
1 1 1
2 2 43 3 3 31 1 1 1
4 4 4 4
x x x x
x x x x
e e e ez z z
e e e e
′ ′′ ′
′ − + + + + + +
)
2
3
2
3
2 31
2 2 22 33 3 3 1
42 2 2
3 3 3
1 1 1
4 2 83 3 31 1 1
4 4 4
xx
xa
ed
x x xe
x x x
e e ez z z e
e e e
τ−
+
∫
′ + − + + +
By substituting (14) and its first, second and third derivatives in (13) we get
2 2
3 3
2 2
3 3
3 3
2 23 31 1
4 4
x x
x x
e ez z
e e
′′′ ′′+ − + + +
22 2 2 2 2
3 3 3 3 3
2 2 2 2 2
3 3 3 3 3
3 3 3
2 2 43 3 3 3 31 1 1 1 1
4 4 4 4 4
x x x x x
x x x x x
e e e e ez
e e e e e
′ ′− − + + + + + +
2 2 2 2 2 2
3 3 3 3 3 3
2 2 2 2 2 2
3 3 3 3 3 3
1 11 3
2 43 3 3 3 3 31 1 1 1 1 1
4 4 4 4 4 4
x x x x x x
x x x x x x
e e e e e e
e e e e e e
′′ ′ ′ + + − + − + + + + + +
)
2
3
2
3
2 2 31
2 2 2 22 33 3 3 3 1
42 2 2 2
3 3 3 3
3 12
2 83 3 3 31 1 1 1
4 4 4 4
xx
xa
ed
x x x xe
x x x x
e e e ez e
e e e e
τ−
+
∫ + − − + + + +
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Since 'z and z′′
2 2 2 2 2 2
3 3 3 3 3 3
2 2 2 2 2 2
3 3 3 3 3 3
1 1( ) 1 3
2 43 3 3 3 3 31 1 1 1 1 1
4 4 4 4 4 4
x x x x x x
x x x x x x
e e e e e ev x z
e e e e e e
′′ ′ ′ ′′′= + + − + − + + + + + +
)
2
3
2
3
2 2 31
2 2 2 22 33 3 3 3 1
42 2 2 2
3 3 3 3
3 12
2 83 3 3 31 1 1 1
4 4 4 4
xx
xa
ed
x x x xe
x x x x
e e e ez e
e e e e
τ−
+
∫ + − − + + + +
Then from inequality (12) we get
2 2 2 2 2 2
3 3 3 3 3 3
2 2 2 2 2 2
3 3 3 3 3 3
1 11 3
2 43 3 3 3 3 31 1 1 1 1 1
4 4 4 4 4 4
x x x x x x
x x x x x x
e e e e e ez
e e e e e e
′′ ′ ′ ′′′ + + − + − + + + + + +
)
2 2 3
2 2 2 2
3 3 3 3
2 2 2 2
3 3 3 3
3 12
2 83 3 3 31 1 1 1
4 4 4 4
x x x x
x x x x
e e e ez
e e e e
+ − − + + + +
2 2
3 3
2 2
3 3
1 1( ) exp exp
2 23 31 1
4 4
x xx x
x xa a
e ev x d d
e e
τ τ ε
= ≤ + +
∫ ∫
From the boundary condition ( ) 0 ( )y a y b= = and
2
3
2
3
1( ) ( )exp
2 31
4
xx
xa
ey x z x d
e
τ
= − +
∫ we have ( ) 0 ( )z a z b= =
Define:
β =
2 2 2 2 2 2
3 3 3 3 3 3
2 2 2 2 2 2
3 3 3 3 3 3
1 11 3
2 43 3 3 3 3 31 1 1 1 1 1
4 4 4 4 4 4
x x x x x x
x x x x x x
e e e e e e
e e e e e e
′′ ′ ′ + − + − + + + + + +
2 2 3
2 2 2 2
3 3 3 3
2 2 2 2
3 3 3 3
3 12
2 83 3 3 31 1 1 1
4 4 4 4
x x x x
x x x x
e e e e
e e e e
+ − − + + + +
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Then
2 2
3 3
2 2
3 3
1 1( ) ( ) exp exp
2 23 31 1
4 4
x xx x
x xa a
e ez z x v x d d
e e
β τ τ ε
′′′ + = ≤ + +
∫ ∫
using lemma (2)
( )3
max ( ) max '''( )48
b az x z x
−≤
( )3
max ( ) max max ( )48
b az z x z xβ β
−′′′≤ + +
( ) ( )
23 3
3
2
3
1max exp max max ( )
48 2 4831
4
xx
xa
b a b aed z x
e
τ ε β
− − ≤ +
+
∫
since
2
3
2
3
1max exp
2 31
4
xx
xa
ed
e
τ
< ∞
+
∫ on the interval [ ],a b
Hence there exists a constants 0k > such that ( )z x kε≤
2
3
2
3
1( ) ( )exp
2 31
4
xx
xa
ey x z x d
e
τ
= − +
∫
2
3'
2
3
1 max exp
2 31
4
xx
xa
ed k k
e
τ ε ε
≤ − ≤
+
∫
'( )y x k ε⇒ ≤
Then the differential equation
2 2
3 3
2 2
3 3
30
2 3 31 1
4 4
x x
x x
e ey y y y
e e
′′′ ′′ ′+ + + = + +
Has the super stability with boundary condition ( ) 0 ( )y a y b= = on closed bounded interval [ ],a b
To show the
2 2 2 2 2 2
3 3 3 3 3 3
2 2 2 2 2 2
3 3 3 3 3 3
1 1max 1 3
2 43 3 3 3 3 31 1 1 1 1 1
4 4 4 4 4 4
x x x x x x
x x x x x x
e e e e e e
e e e e e e
′′ ′ ′ + − + − + + + + + + +
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}( )
2 2 3
2 2 2 2
3 3 3 3
2 2 2 2 3
3 3 3 3
3 1 482 (**)
2 83 3 3 31 1 1 1
4 4 4 4
x x x x
x x x x
e e e e
b ae e e e
− − < − − − − − − −+ + + +
To make our work simple we simplify the expression (**)
Then the simplified form of (**) is
( )
2 3 42 2 2 2
3 3 3 3
4 32
3
5 15 35 33
6 8 32 128 48max 1
31
2
x x x x
x
e e e e
b ae
+ + − + <
− +
---------- (***)
Figure:1
The graph which shows the
( )
2 3 42 2 2 2
3 3 3 3
4 323
5 15 35 336 8 32 128 48
max 13
12
x x x x
x
e e e e
b ae
+ + − + <
− +
Conclusion
In this study, the super stability of third order linear
ordinary differential homogeneous equation in the form of
( ) ( ) ( ) ( ) ( ) ( ) ( ) 0y x m x y x p x y x q x y x′′′ ′′ ′+ + + = with
boundary condition was established. And the standard
work of JinghaoHuang, QusuayH.Alqifiary, Yongjin Li on
investigating the super stability of second order linear
ordinary differential homogeneous equation with
boundary condition is extended to the super stability of
third order linear ordinary differential homogeneous
equation with Dirchilet boundary condition.
In this thesis the super stability of third order ordinary
differential homogeneous equation was established using
the same procedure coming researcher can extend for
super stability of higher order differential homogeneous
equation.
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