Almost oscillatory three-dimensional dynamical system

In this article, we investigate oscillation and asymptotic properties for 3D systems of dynamic equations. We show the role of nonlinearities and we apply our results to the adjoint dynamic systems.

2010 Mathematics Subject Classification: 39A10

In this article, we investigate 3D dynamical systems of the form

on a time scale , i.e., a closed subset of real numbers, $\lambda =\pm 1,a,b:\mathbb{T}\mapsto \left[0,\infty \right)$ (not identically zero) and $c:\mathbb{T}\mapsto \left[0,\infty \right)$ are rd-continuous functions such that

and $f,g,h:ℝ\mapsto ℝ$ are continuous functions such that

Here we would like to indicate that none of the functions f, g or h are monotonic. Sometimes we will assume that functions f, g, and h satisfy

where F, G, H are positive constants and Φ_α, Φ _β , and Φ_γ are odd power functions, i.e.,

Here, we consider only unbounded time scales. The theory of time scales is initiated by Stefan Hilger [1] his PhD dissertation in 1988 in order to unify continuous and discrete analysis. The theory of dynamic equations on time scales helps us not only to avoid proving results twice but also to extend them for other time scales such as the set of all integer multiples of a number h > 0, the set of all integer powers of a number q > 1. We refer readers the books by Bohner and Peterson [2, 3] for an excellent introduction with applications and advances in dynamic equations.

The aim of this article is to study oscillatory and asymptotic properties of solutions of (1). The special case of system (1),

is considered on time scales by Akin-Bohner et al. [4], where α, β, γ are ratios of odd positive integers. The continuous version of a system similar to system (1) has been considered by Chanturia [5] and the discrete version of system (1) by Schmeidel [6, 7] see also references therein. System (4) with α = β = 1 can be written as a third-order difference equation with quasi-differences those oscillatory and asymptotic properties have been investigated in [8, 9].

First, we study the case λ = 1. We will obtain asymptotic properties of nonoscillatory solutions of system (1) and we will establish oscillation criteria for system (1). Then we consider the case λ = -1 and we extend our results proved in [4]. In the last section, we apply our results to adjoint systems and we discuss the role of nonlinearities. Our results are new also for the difference systems.

A solution of system (1) is denoted by (x, y, z). Solution (x, y, z) defined on $\left[t_0,\infty \right)\subset \mathbb{T},t_0\in \mathbb{T}$, is said to be proper if

A proper solution of system (1) is said to be oscillatory if all of its components x, y, z are oscillatory, i.e., neither eventually positive nor eventually negative. Otherwise, proper solution is said to be nonoscillatory. Obviously, if one component of a solution (x, y, z) is eventually of one sign, then all its components are eventually of one sign and so nonoscillatory solutions have all components nonoscillatory.

System (1) with λ = 1 is said to be almost oscillatory, or has Property B, if every solution (x, y, z) of system (1) is either oscillatory or

System (1) with λ = -1 is said to be almost oscillatory, or has Property A, if every solution (x, y, z) of system (1) is either oscillatory or

Remark 1.1. The terminology used in the above definitions is not unified in the literature. The terminology Property A and Property B are due to [5, 10]. As can be noticed in [[11], p. 126] in a picturesque way, Property A and Property B state that every solution which may oscillate, does oscillate. Some authors use a different terminology--the system or higher order equation is almost oscillatory, or strongly oscillatory[11].

Changing order of integration is used in our main results. The proof of following lemma can be found in the article by Akin-Bohner and Sun [12].

Lemma 1.1. Let$a,c\in {\mathsf{\text{C}}}_{\mathsf{\text{rd}}}\left(\mathbb{T},{ℝ}^{+}\right)$. Then

and

Remark 1.2. Let $a,c\in {\mathsf{\text{C}}}_{\mathsf{\text{rd}}}\left(\mathbb{T},{ℝ}^{+}\right)$ such that

Then

Throughout this and the following section, we consider the system (1), when λ = 1.

In this section, we study asymptotic properties of nonoscillatory solutions which we use in the following section. The following lemma is the analogy of a lemma in [10].

Lemma 2.1. Assume that (x, y, z) is a nonoscillatory solution of system (1) with λ = 1. For large$t\in \mathbb{T}$, let

Then every nonoscillatory solution of system (1) with λ = 1 is of either Type (a) or Type (c).

Proof. Let (x, y, z) be a nonoscillatory solution of system (1). Without loss of generality, we assume that x(t) > 0 for $t\ge T,T\in \mathbb{T}$. Then we have y(t) and z(t) are monotone for t ≥ T. Since y is monotonic, we have either y(t) < 0 or y(t) > 0 for all t ≥ T. Similarly, z(t) < 0 or z(t) > 0 for all t ≥ T.

First, let z(t) > 0 for t ≥ T. Suppose y(t) < 0 for large t. Since z is positive and increasing, there exists $\ell >0$ such that $z\left(t\right)\ge \ell$ for large t. From here and integrating the second equation we get $y\left(t\right)-y\left(T\right)\ge \ell {\int }_T^{t}b\left(s\right)\mathrm{\Delta }s$, thus y(t) → ∞, which is a contradiction with the fact that y(t) < 0. Therefore, this case is not possible, and so (x, y, z) is of Type (a).

Now let z(t) < 0 for t ≥ T. Suppose that y(t) < 0 for large t. It implies that x is eventually positive decreasing. Integrating the first equation, we get x(t) → ∞, which is a contradiction with the boundedness of x. Therefore, this case is not possible, and so (x, y, z) is of Type (c).

The proof for the case when x(t) < 0 for large t is analog. □

Solutions of Type (a) are sometimes called strongly monotone solutions (see e.g., [10]).

Lemma 2.2. Any Type (a) solution (x, y, z) of system (1) with λ = 1 satisfies

Proof. Let (x, y, z) be a Type (a) solution of system (1) such that all the signs of all three components are eventually positive. Then there exists $T\in \mathbb{T}$ such that x(t) > 0 and y(t) > 0 and z(t) > 0 for t ≥ T. Using the first equation of system (1) and noting that y is eventually increasing, there exist $T_1\ge T,t_1\in \mathbb{T}$ and a constant K > 0 such that f(y(t)) ≥ K for t ≥ T₁, we have

Integrating the above inequality from T₁ to ${}_t\in \mathbb{T},T_1\ge T$ yields

This implies that $\underset{t\to \infty }{\mathsf{\text{lim}}}x\left(t\right)=\infty$ by (2).

Using the second equation of system (1) and noting that z is eventually increasing, there exist $T_3\ge T_{2,}{T}_3\in \mathbb{T}$ and a constant L > 0 such that g(z(t)) ≥ L for t ≥ T₃ we have

Integrating the above inequality from T₃ to t, $T_3\in \mathbb{T},T_3\ge T_2$ gives us

From the above inequality, (2) implies $\underset{t\to \infty }{\mathsf{\text{lim}}}y\left(t\right)=\infty$. □

Theorem 2.1. Assume that there exist positive constants F, H and α, γ such that

and

Then any Type (a) solution (x, y, z) of system (1) with λ = 1 satisfies (5).

Proof. Let (x, y, z) be a Type (a) solution of system (1) such that x(t) > 0 and y(t) > 0 and z(t) > 0 for t ≥ T. By Lemma 2.2 it is sufficient to prove that lim_t→∞|z(t)| = ∞. Using the estimation (7), there exists $T_1\ge T_3,T_1\in \mathbb{T}$, such that f(y(t)) ≥ Fy^α (t) for t ≥ T₁. From here and by integration of the first equation of system (1) we get we have

Using the third equation of system (1) and the estimation (9), there exist $T_2\ge T_1,T_2\in \mathbb{T}$, and a constant H > 0 such that h(x(t)) ≥ Hx^γ (t) for t ≥ T₂, we have

Integrating this expression from T₂ to t gives us

As t → ∞, $\underset{t\to \infty }{\mathsf{\text{lim}}}z\left(t\right)=\infty$ by (8). By Lemma 2.2, the proof is completed. □

We conclude this section with the property Type (c) solution of (1) which will be needed in the following section.

Lemma 2.3. Assume that (x, y, z) is a Type (c) solution of system (1) with λ = 1. Then

Proof. Assume that (x, y, z) is a nonoscillatory Type (c) solution of system (1). Without loss of generality, assume that x(t) > 0 for $t\ge T_1,T_1\in \mathbb{T}$. Then y(t) > 0 and z(t) < 0 for t ≥ T₁. Since z is increasing, $\underset{t\to \infty }{\mathsf{\text{lim}}}z\left(t\right)\le 0$. Suppose that $\underset{t\to \infty }{\mathsf{\text{lim}}}z\left(t\right)=l<0$. Then there exists $T_2\ge T_1,T_2\in \mathbb{T}$ such that g(z(t)) ≤ l, t ≥ T₂. Integrating the second equation of system (1) from T₁ to t, we have

and therefore (2) implies that $\underset{t\to \infty }{\mathsf{\text{lim}}}y\left(t\right)=-\infty$. But this contradicts the fact that y(t) > 0 for t ≥ T₁. Therefore, $\underset{t\to \infty }{\mathsf{\text{lim}}}z\left(t\right)=0$. □

We now establish conditions that system (1) is almost oscillatory.

Observe that by Lemmas 2.1 and 2.2, every bounded solution is either Type (c) or oscillatory. Hence, if system (1) is almost oscillatory, then every bounded solution is oscillatory.

Our first result is

Theorem 3.1. Assume

Then system (1) with λ = 1 is almost oscillatory.

Proof. From Lemma 2.1, we know that nonoscillatory solutions are either Type (a) or Type (c). Assume (x, y, z) is a Type (c) solution of system (1). Without loss of generality, assume that there exists $T\in \mathbb{T}$ such that x(t) > 0, y(t) > 0, and z(t) < 0 for t ≥ T. Since x is eventually increasing, there exists l > 0 such that h(x(t)) ≥ l for t ≥ T. Integrating the third equation of system (1) and using the positivity and the monotonicity of x we have

and so (10) implies $\underset{t\to \infty }{\mathsf{\text{lim}}}z\left(t\right)=\infty$. This contradicts the assumptions on z. Therefore, solutions of Type (c) are not possible. If (x, y, z) is a Type (a), then from Lemma 2.2 and (10), we obtain (5). □

Remark 3.1. Theorem 3.1 extends [[6], Theorem 2] for difference systems where it is proved that every bounded solution of (1) with λ = 1 is oscillatory.

Theorem 3.2. Let there exists G > 0 and β ≤ 1 such that

and

Then every nonoscillatory solution of (1) with λ = 1 is a strongly monotone solution.

In addition, if for some F > 0 and α > 0

and (8) holds, then system (1) with λ = 1 is almost oscillatory.

Proof. Assume (x, y, z) is a Type (c) solution of system (1). Without loss of generality, assume that there exists $T\in \mathbb{T}$ such that x(t) > 0, y(t) > 0 and z(t) < 0 for t ≥ T. Since x is eventually increasing, there exists l > 0 such that h(x(t)) ≤ l for large t. By Lemma 2.3 we have lim_t→∞z(t) = 0 and so

Using (11) and the fact β ≤ 1, we have for large t

Integrating the second equation of system (1) we have

thus

Using Lemma 1.1 in the last integration we get

Passing t → ∞ and using (12), we get a contradiction with the boundedness of y.

The second statement follows from Theorem 2.1. □

Theorem 3.3. Assume (3) and αβγ > 1. If

then every nonoscillatory solution of (1) with λ = 1 is a strongly monotone solution. In addition, if (8) holds, then system (1) with λ = 1 is almost oscillatory.

Proof. By Lemma 2.1 any nonoscillatory solution of system (1) is either of Type (a) or (c) for $t\ge T,T\in \mathbb{T}$. We show that a nonoscillatory solution of system (1) of Type (c) cannot occur. Assume that there exists a nonoscillatory solution (x, y, z) of system (1) of Type (c) for t ≥ T. Without loss of generality, we assume that x(t) > 0 for t ≥ T.

By Lemma 2.3 we have $\underset{t\to \infty }{\mathsf{\text{lim}}}z\left(t\right)=0$. Since y is eventually decreasing, there exists $\underset{t\to \infty }{\mathsf{\text{lim}}}y\left(t\right)=l\ge 0$. Integrating third and second equations, we obtain

and

Since y is eventually decreasing, l ≥ 0 and x is eventually increasing, by (14) we have

This implies that

Multiplying this inequality by a, dividing it by x^αβγ (σ(t)), and using the first equation gives us

and so

On the other hand, by the chain rule, [[2], Theorem 1.90] we have

Since 0 < x(t) ≤ x(t) + μhx^Δ(t) ≤ x(t) + μx^Δ(t) = x^σ(t),

Integrating the above inequality from T₁ to t yields

As t → ∞, we obtain that

but this contradicts (15) as t → ∞. □

Remark 3.2. Theorem 3.3 extends [[5], Theorem 2.4] stated for differential systems.

In this section, we study the case λ = -1.

We start with the classification of solutions of system (1) with λ = -1. This is an analogue of Kiguradze lemma.

Lemma 4.1. Assume that (x, y, z) is a nonoscillatory solution of system (1) with λ = -1. For large$t\in \mathbb{T}$, let

Then every nonoscillatory solution of system (1) with λ = -1 is either Type (a) or Type (b).

Proof. It is similar as the proof [[4], Lemma 3.2], so the details are omitted. □

Solution of Type (b) are sometimes called Kneser solutions (see e.g., [10]).

Lemma 4.2. Assume (x, y, z) is a Type (b) solution of system (1) with λ = -1. Then

Proof. Assume (x, y, z) is a Type (b) solution of system (1) and x(t) > 0, y(t) < 0, and z(t) > 0 for $t\ge T_1\left(T_1\in \mathbb{T}\right)$. Since y(t) is increasing, we have $\underset{t\to \infty }{\mathsf{\text{lim}}}y\left(t\right)\le 0$. Assume lim $\underset{t\to \infty }{\mathsf{\text{lim}}}y\left(t\right)\ne 0$. Then there exist T₂≥ T₁ and a constant l < 0 such that f (y(t)) ≤ l for t ≥ T₂. Integrating the first equation of system (1) from T₂ to t, we have

and so (2) implies $\underset{t\to \infty }{\mathsf{\text{lim}}}x\left(t\right)=-\infty$. This contradicts our assumptions about the nature of x and therefore $\underset{t\to \infty }{\mathsf{\text{lim}}}y\left(t\right)=0$. In a similar way, we can show that $\underset{t\to \infty }{\mathsf{\text{lim}}}z\left(t\right)=0$. □

Theorem 4.1. Assume (10). Then system (1) with λ = -1 is almost oscillatory.

Proof. Assume (x, y, z) is a nonoscillatory solution of system (1). By Lemma 4.1, nonoscillatory solutions are either Type (a) or Type (c). Assume (x, y, z) is a Type (a) solution. Without loss of generality, assume that there exists $T\in \mathbb{T}$ such that x(t) > 0, y(t) > 0, and z(t) > 0 for t ≥ T. Since x is eventually increasing, there exists l > 0 such that h(x(t)) ≥ l for t ≥ T. Integrating the third equation of system (1) and using the positivity and the monotonicity of x we have

and so (10) implies $\underset{t\to \infty }{\mathsf{\text{lim}}}z\left(t\right)=\infty$ which is a contradiction with the boundedness of z. Therefore, solutions of Type (a) are not possible. If (x, y, z) is a Type (c), then in view of Lemma 4.2 it is sufficient to prove that x has a zero limit. If lim_t→∞x(t) = L > 0, then integrating the third equation from T to t we have

and passing t → ∞ we get a contradiction with the boundedness of z. □

Next we assume

Similarly, as in [[4], Theorem 3.1] for system (4) the following holds.

Theorem 4.2. Assume that there exist positive constants F, G and α, β such that

If either

or

then every Kneser solution of system (1) with λ = -1 satisfies$\underset{t\to \infty }{\mathsf{\text{lim}}}x\left(t\right)=0$.

Proof. Without loss of generality, assume that (x, y, z) is a Kneser solution of system (1) such that x(t) > 0 for t ≥ t₀, t₀ ∈ [0,∞). From the first equation of system (1), x is nonincreasing, and $\underset{t\to \infty }{\mathsf{\text{lim}}}x\left(t\right)=L_1<\infty$. By Lemma 4.2, $\underset{t\to \infty }{\mathsf{\text{lim}}}y\left(t\right)=\underset{t\to \infty }{\mathsf{\text{lim}}}z\left(t\right)=0$. We now show that $\underset{t\to \infty }{\mathsf{\text{lim}}}x\left(t\right)=0$, and so we let $\underset{t\to \infty }{\mathsf{\text{lim}}}x\left(t\right)=L_1>0$. Then there exists T₁≥ t₀, T₁ ∈ [0, ∞) and L > 0 such that h(x(t)) > L^β for t ≥ T₁.

Integrating the third equation from t to ∞ we have

and so

Hence, integrating the second equation of system (1) from T to t we have

If (17), then $\underset{t\to \infty }{\mathsf{\text{lim}}}y\left(t\right)=-\infty$, which is a contradiction.

Assume (18). Integrating the second equation of system (1) from t to ∞ and using the fact $\underset{t\to \infty }{\mathsf{\text{lim}}}y\left(t\right)=0$, we get the estimation

Therefore integrating the first equation of (1) from T₁ to t

we have

This implies that $\underset{t\to \infty }{\mathsf{\text{lim}}}x\left(t\right)=-\infty$, a contradiction. □

Theorem 4.3. Assume (3) and αβγ < 1. If

then every nonoscillatory solution of (1) with λ = -1 is a Kneser solution.

In addition, if (17) holds, then system (1) with λ = -1 is almost oscillatory.

Proof. Suppose (x, y, z) is a nonoscillatory solution of system (1). By Lemma 4.1, each nonoscillatory solution of system (1) is either Type (a) or Type (b). Without loss of generality, we assume that x(t) > 0 for $t\ge T_1,T_1\in \mathbb{T}$.

Assume (x, y, z) is of Type (a). Integrating the second equation of system (1) from T₁ to t and using the positivity of y yields

Since z(t) is positive decreasing for t ≥ T₁ from (3) we have

Integrating the first equation of system (1) from $T_2\in \mathbb{T}\left(T_2\ge T_1\right)$ to t and using (3) gives us

From (20) and the monotonicity of z we conclude that

Using the preceding inequality and (3), the third equation of system (1) yields

Dividing the above inequality by z^aβγ (t) and integrating it from T₂ to t yields

Now we prove that

We proceed by the similar argument as in the proof of Theorem 3.3. We have

thus, because z(t) ≥ z(t) + μ(t) hz^Δ (t) ≥ z^σ (t) > 0, and z is positive decreasing,

Integrating above inequality from T to t we obtain

which yields (21). Hence, passing t → ∞ in (4), we get a contradiction. Therefore, system (1) cannot have Type (a) solutions. So, every nonoscillatory solution is of Type (b). By Lemma 4.2 and Theorem 4.2, we have (6). So this completes the proof. □

Remark 4.1. Theorem 4.3 extends [[6], Theorem 1] stated for difference systems.

In this section, we consider (4) where λ = ± 1 and we summarize the above results.

We conclude that if (10) holds, then, independently on the nonlinearities, (1) is almost oscillatory for λ = ± 1. If (16) holds, then, in general, almost oscillation depends on the sign of λ and on the types of nonlinearities.

Consider the following adjoint systems:

and

The terminology "adjoint system" is used due to the fact that the corresponding matrices of systems (22) and (23) are adjoint.

Applying our results from Sections 3 and 4 we get conditions when both systems are almost oscillatory.

Corollary 5.1. Let γ = 1. If (12) holds and

then linear adjoint systems (22) and (23) are almost oscillatory.

Proof. By Theorem 3.2 we have that (22) is almost oscillatory. Applying two times the change of integration for triple integrals we have

Thus, interchanging a and b, we get from Theorem 4.1 that every Kneser solution of (23) satisfies (6). This together with [[4], Theorem 4.4] result that (23) is almost oscillatory. □

Corollary 5.2. Assume that γ > 1,

and

Then both systems (22) and (23) are almost oscillatory.

Proof. It follows from Theorems 3.2 and 4.3. □

The second author is supported by Grant P201/11/0768 of the Grant Agency of the Czech Republic.

Authors and Affiliations

1. Missouri University of Science and Technology, 310 Rolla Building, Missouri, 65409-0020, USA

   Elvan Akin-Bohner

2. Masaryk University Brno, CZ-66295, Brno, Czech Republic

   Zuzana Došlá

3. Marshall University Huntington, Huntington, WV, 25755, USA

   Bonita Lawrence

Corresponding author

Correspondence to Elvan Akin-Bohner.

Competing interests

The authors declare that they have no competing interests.

Authors' contributions

All authors contributed equally to the manuscript and read and approved the final draft.

Open Access This article is distributed under the terms of the Creative Commons Attribution 2.0 International License (https://creativecommons.org/licenses/by/2.0), which permits unrestricted use, distribution, and reproduction in any medium, provided the original work is properly cited.

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