Growth of solutions for a coupled nonlinear Klein–Gordon system with strong damping, source, and distributed delay terms

In this work, the exponential growth of solutions for a coupled nonlinear Klein–Gordon system with distributed delay, strong damping, and source terms is proved. Take into consideration some suitable assumptions.

In modeling in the biological, physical, and social sciences, it is sometimes necessary to take account of optimal control or time delays inherent in the phenomena (see for example [4, 16]). The inclusion of delays explicitly in the equations is often a simplification or idealization that is introduced because a detailed description of the underlying processes is too complicated to be modeled mathematically, or because some of the details are unknown. More generally, how does the qualitative behavior depend on the form and magnitude of the delays? In this paper we examine how we can apply the distributed delay term for knowing the behavior of growth of solutions for a coupled nonlinear Klein–Gordon system with strong damping, source terms.

We consider the following system:

where Ω is a bounded domain in \(\mathbb{R}^{n}\) with smooth boundary ∂Ω and the source terms are defined as follows:

and \(m_{1},m_{2},\omega _{1},\omega _{2},\mu _{1},\mu _{3},a_{1},b_{1}>0\), and \(\tau _{1},\tau _{2}\) are the time delay with \(0\leq \tau _{1}<\tau _{2}\), and \(\mu _{2},\mu _{4}\) are \(L^{\infty }\) functions, and \(g,h\) are differentiable functions.

Viscous materials are the opposite of elastic materials that possess the ability to store and dissipate mechanical energy. As the mechanical properties of these viscous substances are of great importance when they appear in many applications of natural sciences, many authors have given attention to this problem since the beginning of the new millennium.

In the case of only one equation and if \(\omega _{1}=0\) (i.e., \(\Delta u_{t}=0\)), and \(\mu _{1}=\mu _{2}=0\). Our problem (1.1) has been studied in [7]. By using the Galerkin method they established the local existence result. Also, they showed the local solution is global in time under suitable conditions and with the same rate of decaying (polynomial or exponential) of the kernel g. They proved that the dissipation given by the viscoelastic integral term is strong enough to stabilize the oscillations of the solution. Moreover, their result has been obtained under weaker conditions than those used in [11]. In [12], the authors proved the exponential decay of the following problem:

This later result has been improved in [7], in which they showed that the viscoelastic dissipation alone is strong enough to stabilize the problem even with an exponential rate.

In many works on this field under assumptions of the kernel g. For problem (1.1) and with \(\mu _{1}\neq 0\), for example, in [18], the authors proved a blow-up result for the following problem:

where g satisfies \(\int _{0}^{\infty }g(s)\,ds<(2p-4)/(2p-3)\), initial data were supported with negative energy like that \(\int u_{0}u_{1}\,dx>0\).

If \((w>0)\). In [29], the authors considered the following problem:

Under suitable assumptions on g that there were solutions of (1.5) with initial energy, they showed the blow-up in a finite time. For the same problem (1.5), in [30], Song et al. proved that there were solutions of (1.5) with positive initial energy that blows up in finite time. In addition, in [19] the authors showed a blow-up result if \(p>m\) and established the global existence of the following problem:

In the case of coupled of equations, in [2], the authors studied the following system of equations:

with nonlinear functions \(f_{1}\) and \(f_{2}\) satisfying appropriate conditions. Under certain restrictions imposed on the parameters and the initial data, they obtained numerous results on the existence of weak solutions. They also showed that any weak solution with negative initial energy blows up for a finite period of time by using the same techniques as in [17].

In [6], the authors considered the system:

where they stated and proved the blow-up in finite time of solution under some restrictions on the initial data and (with positive initial energy) for some conditions on the functions \(f_{1}\) and \(f_{2}\).

Later, in [23], the authors extended the result of [6], where they considered the following nonlinear viscoelastic system:

and proved that the solutions of the system of wave equations with viscoelastic term, degenerate damping, and strong nonlinear sources acting in both equations at the same time are globally nonexisting provided that the initial data are sufficiently large in a bounded domain of Ω.

To complement the above works, we are working to prove under appropriate assumptions that the solution of problem (1.1) grows exponentially:

The paper is organized as follows. In Sect. 2, some necessary assumptions related to the problem are given. Then, in Sect. 3, the main result is proved.

We consider the following assumptions:

1. (A1)

   \(g,h:\mathbb{R}_{+}\rightarrow \mathbb{R}_{+}\) are differentiable and decreasing functions such that

   $$ \textstyle\begin{cases} g(t)\geq 0, \qquad 1-\int _{0}^{\infty }g ( s ) \,ds=l_{1}>0, \\ h(t)\geq 0,\qquad 1-\int _{0}^{\infty }h ( s ) \,ds=l_{2}>0.\end{cases} $$

   (2.1)
2. (A2)

   There exist constants \(\xi _{1}, \xi _{2}>0\) such that

   $$ \textstyle\begin{cases} g^{\prime } ( t ) \leq -\xi _{1}g ( t ),\quad t \geq 0, \\ h^{\prime } ( t ) \leq -\xi _{2}h ( t ),\quad t \geq 0.\end{cases} $$

   (2.2)
3. (A3)

   \(\mu _{2},\mu _{4}:[\tau _{1},\tau _{2}]\rightarrow \mathbb{R}\) are \(L^{\infty }\) functions so that, for all \(\delta >\frac{1}{2}\),

   $$\begin{aligned} \begin{aligned} &\biggl(\frac{2\delta -1}{2}\biggr) \int _{\tau _{1}}^{\tau _{2}} \bigl\vert \mu _{2}( \varrho ) \bigr\vert \,d\varrho < \mu _{1}, \\ &\biggl(\frac{2\delta -1}{2}\biggr) \int _{\tau _{1}}^{\tau _{2}} \bigl\vert \mu _{4}( \varrho ) \bigr\vert \,d\varrho < \mu _{3}. \end{aligned} \end{aligned}$$

   (2.3)

In this section, the blow-up result of solution of problem (1.1) is proved.

First, as in [22], we introduce the new variables:

then

and

Let us denote

Therefore, problem (1.1) takes the form

with the initial and boundary condition

where

Theorem 3.1

Assume (2.1), (2.2), and (2.3) hold. Let

Then, for any initial data,

where

problem (3.4) has a unique solution

for some\(T>0\).

In the next theorem we give the global existence result, its proof is based on the potential well depth method in which the concept of so-called stable set appears, where we show that if we restrict our initial data in the stable set, then our local solution obtained is global in time. We will make use of arguments in [28].

Theorem 3.2

Suppose that (2.1), (2.2), (2.3), and (3.6) hold. If\(u_{0},v_{0}\in W\), \(u_{1},v_{1}\in H_{0}^{1}(\varOmega )\), \(y,z\in L^{2}(\varOmega \times (0,1)\times (\tau _{1},\tau _{2}))\), and

where\(C_{\ast }\)is the best Poincare constant, then the local solution\((u,v,y,z)\)is global in time.

In order to achieve the main result, the following lemmas are needed.

Lemma 3.1

There exists a function \(F(u,v)\) such that

where

taking \(a_{1}=b_{1}=1\) for convenience.

Lemma 3.2

([23])

There exist two positive constants \(c_{0}\) and \(c_{1}\) such that

Define the energy functional as follows.

Lemma 3.3

Assume that (2.1), (2.2), (2.3), and (3.6) hold, let\((u,v,y,z)\)be a solution of (3.4), then\(E(t)\)is nonincreasing, that is,

satisfies

where

Proof

By multiplying the first and the second equation in (3.4) respectively by \(u_{t},v_{t}\) and integrating over Ω, we get

and, from the initial and boundary condition in (3.4)

and

then

By (3.12)–(3.14), we get (3.9). Also, by using Young’s inequality, (2.1), (2.2), and (2.3) in (3.15), we obtain (3.10). □

Now, we define the functional

Theorem 3.3

Assume that (2.1)–(2.3) and (3.6) hold. Assume further that\(E(0)<0\), then the solution of problem (3.4) grows exponentially.

Proof

From (3.9 we have

Therefore,

Hence

and

Setting

where \(\varepsilon >0\) to be assigned later.

By multiplying the first and second equation on (3.4) respectively by \(u,v\) and with a derivative of (3.21), we get

Using Young’s inequality, we get

Thus

Also

so

From (3.22)

Therefore, using (3.19) and by setting \(\delta _{1},\delta _{1}\) so that \(\frac{1}{4\delta _{1}c_{3}}=\frac{\kappa }{2}\) and \(\frac{1}{4\delta _{2}c_{3}}=\frac{\kappa }{2}\), substituting in (3.27), we get

For \(0< a<1\), from (3.16)

Substituting in (3.28), we get

Using Poincare’s inequality, we obtain

In this stage, we take \(a>0\) small enough so that

and we assume

Then we choose κ so large that

We fixed κ and a, we appoint ε small enough so that

and from (3.21) we get

Thus, for some \(\beta >0\), estimate (3.31) becomes

By (3.8), for some \(\beta _{1}>0\),

and

Next, using Young’s and Poincare’s inequalities ([12]), thus from (3.21), we have

for some \(c>0\). From inequalities (3.34) and (3.37) we obtain the differential inequality

where \(\lambda >0\), depending only on β and c.

A simple integration of (3.38) gives

From (3.21) and (3.33), then

By (3.39) and (3.40) we have

Therefore, we conclude that the solution grows exponentially. This completes the proof. □

In this work, the growth of solutions for a coupled nonlinear Klein–Gordon system with strong damping, source, and distributed delay terms was studied. Next, motivated by last works in [1, 3, 5, 8–10, 13–15, 20, 21, 24–27, 31], and [16], we obtained the growth and blow-up for the studied problem (1.1) by constructing a type of cross-constrained variational problem and establishing so-called cross-invariant manifolds of the evolution flow. Then, the result of how small the initial data for which the solution exists globally was proved by using the scaling argument.

Acknowledgements

The authors would like to thank the anonymous referees and the handling editor for their careful reading and for relevant remarks/suggestions. The third author would like to thank his Professors/Scientists Pr. Mohamed Haiour and Pr. Azzedine Benchettah for the important content of masters and PhD courses in pure and applied mathematics which he received during his studies. Moreover, he thanks them for the additional help they provided to him during office hours in their office about the few concepts/difficulties he had encountered, and he appreciates their talent and dedication for their postgraduate students currently and previously!

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Authors and Affiliations

1. Laboratory of Pure and Applied Mathematics, Amar Teledji Laghouat University, Laghouat, Algeria

   Abdelaziz Rahmoune & Djamel Ouchenane

2. Department of Mathematics, College of Sciences and Arts, Al-Ras, Qassim University, Buraidah, Kingdom of Saudi Arabia

   Salah Boulaaras

3. Laboratory of Fundamental and Applied Mathematics of Oran (LMFAO), University of Oran 1, Ahmed Benbella, Oran, Algeria

   Salah Boulaaras

4. Department of Mathematics, Anand International College of Engineering, Jaipur, India

   Praveen Agarwal

5. International Center for Basic and Applied Sciences, Jaipur, 302029, India

   Praveen Agarwal

6. Department of Mathematics, Harish-Chandra Research Institute, Allahabad, 211019, India

   Praveen Agarwal

7. Department of Mathematics, Netaji Subhas University of Technology Dwarka Sector-3, Dwarka, Delhi, 110078, India

   Praveen Agarwal

Contributions

The authors contributed equally in this article. They have all read and approved the final manuscript.

Corresponding author

Correspondence to Salah Boulaaras.

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Not applicable.

Competing interests

The authors declare that there is no conflict of interests regarding the publication of this manuscript. The authors declare that they have no competing interests.

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