DOI : https://doi.org/10.5281/zenodo.18517374
- Open Access
- Authors : Ei Ei Kyaw, Theint Theint Thu
- Paper ID : IJERTV15IS010695
- Volume & Issue : Volume 15, Issue 01 , January – 2026
- Published (First Online): 07-02-2026
- ISSN (Online) : 2278-0181
- Publisher Name : IJERT
- License:
This work is licensed under a Creative Commons Attribution 4.0 International License
Positive Stationary Solutions of Cross-Diffusive Competition Model with A Protection Zone
Ei Ei Kyaw
Department of Engineering Mathematics Polytechnic University (Myitkyina) Myanmar
Theint Theint Thu
Department of Engineering Mathematics Polytechnic University (Myitkyina) Myanmar
Abstract – In this paper, positive stationary solutions of a heterogeneous, and satisfies x bx 0 in 1 and cross-diffusive competition model with a protection zone for the weak competitor are examined. The asymptotic behaviour of x 1 0 and bx b 0 in \ 1 ; 0 is a constant; positive stationary solutions is obtained for any birth rate as the cross-diffusion coefficient tends to infinity. denotes the Laplacian operator on the space variable x; ux, t and vx, t represent the population densities of
Keywords – Cross-diffusion; heterogeneous environment; stationary solution
the respective competing species.
In the model, u lives in the larger habitat ,
and
1 is
INTRODUCTION
its protection zone, where u can leave and enter the
protection zone freely, while v can only live outside 1.
Competition is one of the most essential mechanisms in ecology, shaping the distribution and abundance of biological species. When two species utilize similar resources, their interaction may lead to coexistence, competitive exclusion, or complex spatial-temporal dynamics depending on environmental conditions and intrinsic population traits. To analyze such processes rigorously, mathematical models, especially those based on systems of partial differential equations, have become indispensable tools.
The effects of environmental heterogeneity with large
Thus we impose a no-flux boundary condition on 1 for v. On , a no-flux boundary condition is also assumed for both species, and no individuals cross the boundary . Throughout the paper, we write \ .
It should be noted that k x vu is the cross-diffusion term to model the habitat segregation phenomena between two competing species. From the cross-diffusion term, u diffuses to low density regions of v in their common living habitat
cross-diffusion are studied. In the following, we consider
and the coefficient k denotes the sensitivity of the
Lotka-Volterra cross-diffusive competition model with a protection
zone
ut 1 kx v u u u bx v, x , t 0,
competitor u to the population pressure from the other competitor v.
The corresponding stationary problem is
We denote by D , U and N , U the first eigenvalue
where
is a bounded domain with
of over the bounded domain U with Dirichlet and Neumann boundary conditions, respectively. We usually omit
U in the notation if U . If the potential function is
smooth boundary
, 1 is a subdomain of with smooth
omitted, then we understand 0. It is well-known that the
boundary
1
and
1 ; n is the outward unit normal
following properties hold:
vector on the boundary; positive constants and are the
- the mapping q B q,U : L U is continuous
intrinsic growth rates of the respective species;
bx and d 0 are the interspecific competitive pressure on
1
with B D or B N;
- and v, respectively;
x and b x
are spatially
- and v, respectively;
- B q , U B q , U if q q and q q
with
- D q, U D q, U if U U , and
If 0, x , then 0, x , and satisfies
The usual norm of the space Lp U for p 1, is
defined by
Then, it follows that is an eigenvalue of (4), and satisfies Re N , 0. So, the eigenvalues with
1 p
u uxp dx and u max ux .
associated eigenfunctions of the form , 0 possess positive real parts.
On the other hand, if
then is an
- Properties of Stability and A Priori Estimates
In this section, we will show the stability of semi-trivial solutions and a priori estimates for any positive solution of (2).
It is clear that the steady-state problem (2) admits two
eigenvalue of the following problem:
semi-trivial solutions , 0 and 0, in addition to the n
trivial solution 0, 0. The stabilities of such trivial and semi- trivial solutions are shown in the following lemma.
- Lemma
We have the following stability results:
Then, if d, we see that any eigenvalue of (5) satisfies Re N d , d 0.
Thus, the real parts of any eigenvalue of (3) are positive, , 0 is asymptotically stable.
- the trivial solution 0, 0 is always unstable;
If d,
then
d 0
is an eigenvalue to
- the semi-trivial solution , 0
is asymptotically
the second equation of (3) with a unique positive
stable if d, while it is unstable if d;
eigenfunction
normalized as
- the semi-trivial solution 0,
is asymptotically
for denote by
N bx
1 kx bx ,
stable if
1 1 kx , 0,
while it is unstable if
we know that
is an eigenvalue of (3) with an
1 1 kx Proof:
eigenfunction , , , 0 is unstable.
The proof of (iii) is rather similar to that of [7].
The proof of (i) is clear. Therefore, we start proof of (ii).
The linearized parabolic system of (1) at
- the trivial solution 0, 0 is always unstable;
- Lemma
Assume spatial dimension N 3 and U 1 kx v u,
is
there exists a positive constant C independent of k such that any positive solution u, v of (2) satisfies
thus, the corresponding spectral problem is
kx bx , x ,
The proof of lemma is the same as in [6]. So, we omit it.
- Lemma
- Asymptotic Behavior of Positive Solutions as k
In this section, we study the asymptotic behavior of positive solutions of (2) for any , 0 as k , and show(3)
the structure of the positive solution set of the limiting system.
For the asymptotic behavior, we have the following theorem.
- Theorem
Assume spatial dimension N 3,
and
Then by passing to a subsequence if necessary, the following conclusions hold.
It follows that
in .
-
In the following, we discuss the cases
ui , kivi u, w
positive solution of
uniformly in
where u, w
is a
vi 0 and vi in , respectively.
in this case we first show that
- f limk
Let u , v , k
be any sequence such that ui , vi is a
So, we see that
i converges uniformly to some
positive solution of (2) with k ki and ki , we further set
nonnegative constant C2 , i.e., x viui C2 , thus viui 0
Ui 1 kix vi ui .
uniformly in . Since v v v du , letting
Since U
and v
are uniformly bounded by,
we see that
and v is a nonnegative weak,
virtue of Lemma 2.2,
uniformly bounded for p N, we deduce that there exists a
subsequence of k , still denoted by k
, such that
While v 1, it is clear that v 0 in,
thus,
0, it is a contradiction.
for some nonnegative function U, v C1 C1 .
If k v 0,
we also set
By Lp estimates and the Sobolev embedding theorem, and
are uniformly bounded, we
Thus, the Lp
estimates and the Sobolev embedding
i , i ,
theorem deduce that
can show that subject to a subsequence, i
converges
in C1 .
uniformly to some nonnegative constant C1, then i
x uivi C1 uniformly. As x 0 in 0 , we know that
Thus,
ui also converges uniformly to
, and is a
this constant C1 must be zero, i.e.,
ui vi 0
uniformly in
nonnegative weak solution of the equation
. Furthermore, as
i , vi v
in C1 ,
and v is a
nonnegative weak solution of
0, x ,
Furthermore, since
ui , and
wi , are uniformly
0, x .
bounded, the standard elliptic regularity deduces that
n
ui , wi u, w, where u, w is a positive smooth solution
Hence, 0 or ,i.e., u
i 0 or ui uniformly in
of (6).
- If k v , we must have v
- in , then
. If ui 0,
since
vi vi dui dx 0, we see that for
i i , i
sufficiently large i, vi dui
- 0, we derive it is a
U
i
ui
- 0 in C1
.
contradiction; if ui , then
vi v, and v is a
1 ki vi
nonnegative weak solution of
From a similar argument to that of [11], we can deduce that
Udx 0, and U Udx 0,
By virtue of v , 1, we know that v 0 and v 0
Thus U2 dx Udx U Udx 0.
in , thus v 0 in . So d, it is a contradiction.
in C1 .
The proof of the
Therefore, we see that as
vi 0, ki v
- theorem completes.
by passing to a subsequence if necessary. Set wi ki vi , then
bx
Finally, we give the positive solution set of the limiting
system (6). Set U 1 x w u, then (6) is equivalent to
the following system
0, by Lemma 2.2 we can know that
- 0 in C1
for large i. Furthermore, since
some calculations deduce that
By virtue of the local bifurcation theory and regarding
as the bifurcation parameter, we give the following local bifurcation result.
ui ui dx b ui vi dx. Then,
-
- Lemma
Positive solutions of (7) bifurcate from
ui , ui dx b ui vi dx
, 0, X : 0 if and only if d. To be
b vi , ui dx b vi , ui dx,
precise, all positivesolutions of (7) near ,0,d X
can be parameterized as
which means that
is uniformly bounded, thus we know that
is smooth with respect to s and
min u C min C max C max u .
- Theorem
- Theorem
Assume spatial dimension N 3, regarding as the
Furthermore, as the first equation of (7) is the same in [6],
bifurcation parameter, an unbounded branch p of positive
we can deduce that max U C1 for a large number
solutions of (7) bifurcates from the semi-trivial solution curve
C independent of .
So, from the second equation of (7), we see that
for a large positive number C independent of ,
is bounded, the elliptic regularity theory
Proof:
and the Sobolev embedding theorem deduce that
C1 is
Let p E be the maximal connected set of the local
bounded. Thus, we see that
must be unbounded.
bifurcation branch stated in Lemma 3.2 satisfying
Then, max w
is unbounded. Therefore, there exists a
U, w, E \ , 0, d :
p sequence 0,C such that w
U, w satisfies (7) with E C1 C1 ,
Setting W
i , then
Define
then we can
Since P P P , if not, there exists a sequence
such that
So, we know that W
- W, W 0, x and satisfies
together with the local bifurcation
result, we know that (8) holds, and the proof of the theorem
then for large i,
thus
completes.
ACKNOWLEDGMENT
it is a contradiction. If
The author would like to express unlimited gratitude
Since U 0, we see that U . While , 0, d is the
only bifurcation point of positive solutions of (7) bifurcates from , 0 with bifurcation parameter , we know that
d, it is a contradiction. Thus, p is contained in the set of positive solutions of (7). By a similar argument to that of [6], we can further know that p is unbounded in E .
to his foremost, respectable and noble teacher, Associate Professor Dr. Aung Zaw Myint, Department of Mathematics, University of Mandalay for his encouragements on doing research. The author acknowledges the unknown reviewers for their suggestions and patient review on this paper.
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