Oscillation of differential equations in the frame of nonlocal fractional derivatives generated by conformable derivatives

Recently, Jarad et al. in (Adv. Differ. Equ. 2017:247, 2017) defined a new class of nonlocal generalized fractional derivatives, called conformable fractional derivatives (CFDs), based on conformable derivatives. In this paper, sufficient conditions are established for the oscillation of solutions of generalized fractional differential equations of the form

where \(m=\lceil\alpha\rceil\), \({}_{a}\mathfrak{D}^{\alpha,\rho}\) is the left-fractional conformable derivative of order \(\alpha\in\mathbb{C}\), \(\operatorname{Re}(\alpha)\geq0\) in the Riemann–Liouville setting and \({}_{a}\mathfrak {I}^{\alpha,\rho}\) is the left-fractional conformable integral operator. The results are also obtained for CFDs in the Caputo setting. Examples are provided to demonstrate the effectiveness of the main result.

Fractional calculus is still being developed continuously and its operators are used to model complex systems where the kernel of the fractional operators reflects the non-locality [2, 3]. The singularity of the kernel of the fractional operators has recently motivated researchers to present new types of fractional operators with nonsingular kernels and their discrete versions [4–12]. This new trend added another approach in defining fractional derivatives and integrals. In classical fractional operators, the fractionalizing process depends on iterating the weighted usual integrals or some local type derivatives in the way to get the factorial function and then replace it by the gamma function. The theory of fractional calculus with operators having nonsingular kernels depends on a limiting approach via dirac delta functions. Indeed, the fractional derivative with the nonsingular kernel is first defined so that in the limiting case \(\alpha\rightarrow 0\) we get the function itself and when \(\alpha\rightarrow1\) we get the usual derivative of the function. Then the corresponding integral operators are evaluated by the help of Laplace transforms for functions whose convolution with the nonsingular kernel vanishes at the starting point a. The oscillation theory for fractional differential and difference equations was studied by some authors (see [13–21]), thus several definitions of fractional derivatives and fractional integral operators exist in the literature. In this article, we study the oscillation of fractional operators defined by the first approach mentioned above. Namely, we investigate the oscillation of a class of generalized fractional derivatives defined in [1] by iterating the local conformable derivative developed in [22]. We shall name this derivative the conformable fractional derivative (CFD). Although both the CFD with its Caputo setting and the Katugampola-type derivative studied in [23–25] coincide when \(a=0\), they are very different from each other. In fact, the kernel of CFDs depends on the end points a and b which causes many differences from the Katugampola-type one. We shall study the oscillation of conformable fractional differential equation of the form

where \(m=\lceil\alpha\rceil\), \({}_{a}\mathfrak{D}^{\alpha,\rho}\) is the left-fractional conformable derivative of order \(\alpha\in\mathbb{C}\), \(\operatorname{Re}(\alpha)\geq0\) in the Riemann–Liouville setting and \({}_{a}\mathfrak {I}^{\alpha,\rho}\) is the left-fractional conformable integral operator.

The objective of this paper is to study the oscillation of conformable fractional differential equations of the form (1). This will generalize the results obtained in [13, 14] when we take \(a=0\).

This paper is organized as follows. Section 2 introduces some notations and provides the definitions of conformable fractional integral and differential operators together with some basic properties and lemmas that are needed in the proofs of the main theorems. In Sect. 3, the main theorems are presented. Section 4 is devoted to the results obtained for the conformable fractional operators in the Caputo setting where we also remark the oscillation of Katugampola-type fractional operators. Examples are provided in Sect. 5 to demonstrate the effectiveness of the main theorems.

The left conformable derivative starting from a of a function \(f:[a,\infty)\rightarrow\mathbb{R}\) of order \(0<\rho\leq1\) is defined by

If \((T^{\rho}f)(t)\) exists on \((a,b)\), then \(({}_{a}T^{\rho}f)(a)=\lim_{t \to a^{+}}{({}_{a}T^{\rho}f)(t)}\).

If f is differentiable, then

The corresponding left conformable integral is defined as

For the extension to the higher order \(\rho>1\), see [22].

Definition 2.1

([1])

The left-fractional conformable integral operator is defined by

where \(\alpha\in\mathbb{C}\), \(\operatorname{Re}(\alpha)\geq0\).

Definition 2.2

([1])

The left-fractional conformable derivative of order \(\alpha\in\mathbb {C}\), \(\operatorname{Re}(\alpha)\geq0\) in the Riemann–Liouville setting is defined by

where \(m=\lceil \operatorname{Re}(\alpha)\rceil\), \({}_{a}^{m}T^{\rho}=\underbrace{ {}_{a}T^{\rho}{}_{a}T^{\rho}\cdots{}_{a}T^{\rho}}_{m \text{ times}}\) and \({}_{a}T^{\alpha}\) is the left conformable differential operator presented in (2).

Definition 2.3

([1])

The left-Caputo fractional conformable derivative of order \(\alpha\in \mathbb{C}\), \(\operatorname{Re}(\alpha)\geq0\) is defined by

The following identity (see [1]) is essential to solving linear conformable fractional differential equations:

Lemma 2.1

(Young’s inequality [26])

1. (i)

   Let \(X,Y\geq0\), \(u>1\), and \(\frac{1}{u}+\frac{1}{v}=1\), then \(XY\leq\frac{1}{u}X^{u}+\frac{1}{v}Y^{v}\).

2. (ii)

   Let \(X\geq0\), \(Y>0\), \(0< u<1\), and \(\frac{1}{u}+\frac{1}{v}=1\), then \(XY\geq\frac{1}{u}X^{u}+\frac{1}{v}Y^{v}\), where equalities hold if and only if \(Y=X^{u-1}\).

In this section we study the oscillation theory for equation (1).

Lemma 3.1

([1])

Let \(\operatorname{Re}(\alpha)>0\), \(m=-[-\operatorname{Re}(\alpha)]\), \(f\in L(a,b)\), and \({}_{a}\mathfrak {I}^{\alpha,\rho}f \in C_{\rho, a}^{m}[a,b]\). Then

Using Lemma 3.1, we can write the solution representation of (1) as

where \(F(t,x)=r(t)+f_{2}(t,x)-f_{1}(t,x)\) and \(\rho>0\).

A solution of (1) is said to be oscillatory if it has arbitrarily large zeros on \((0,\infty)\); otherwise, it is called nonoscillatory. An equation is said to be oscillatory if all of its solutions are oscillatory.

We prove our results under the following assumptions:

where \(p_{1}, p_{2} \in C([0,\infty),(0,\infty))\) and β, γ are positive constants.

Define

and

Theorem 3.2

Let \(f_{2} =0\) in (1) and condition (7) hold. If

and

for every sufficiently large T, then every solution of (1) is oscillatory.

Proof

Let \(x(t)\) be a nonoscillatory solution of equation (1) with \(f_{2} =0\). Suppose that \(T_{1}>a\) is large enough so that \(x(t)>0\) for \(t\geq T_{1}\). Hence, (7) implies that \(f_{1}(t,x)>0\) for \(t\geq T_{1}\). Using (3), we get from (6)

where Φ and Ψ are defined in (10) and (11), respectively.

Multiplying (14) by \((\frac{t^{\rho}}{\rho} )^{1-\alpha }\), we get

Take \(T_{2}>T_{1}\). We consider two cases as follows.

Case (1): Let \(0<\alpha\leq1\). Then \(m=1\) and \((\frac{t^{\rho}}{\rho} )^{1-\alpha}\Phi(t)=b_{1}t^{\rho-\rho\alpha}(t-a)^{\rho\alpha -\rho}\).

Since the function \(h_{1}(t)=t^{\rho-\rho\alpha}(t-a)^{\rho\alpha-\rho}\) is decreasing for \(\rho>0\) and \(\alpha<1\), we get for \(t\geq T_{2}\)

The function \(h_{2}(t)=t^{\rho-\rho\alpha}[(t-a)^{\rho}-(s-a)^{\rho }]^{\alpha-1}\) is decreasing for \(\rho>0\) and \(\alpha<1\). Thus, we get

Then, from equation (15) and for \(t\geq T_{2}\), we get

hence

which contradicts condition (12).

Case (2): Let \(\alpha>1\). Then \(m\geq2\). Also, \((\frac {t-a}{t} )^{\rho\alpha-\rho}<1\) for \(\alpha>1\) and \(\rho> 0\). The function \(h_{3}(t)=(t-a)^{\rho-\rho j}\) is decreasing for \(j>1\) and \(\rho> 0\). Thus, for \(t\geq T_{2}\), we have

Also, since \((\frac{t^{\rho}}{\rho} )^{1-\alpha}<1\) and \((\frac {(t-a)^{\rho}-(s-a)^{\rho}}{t^{\rho}} )^{\alpha-1}<1\) for \(\alpha>1\) and \(\rho> 0\), we get

From (15), (18), and (19), we conclude that

for \(t\geq T_{2}\). Hence

which contradicts condition (12). Therefore, we conclude that \(x(t)\) is oscillatory. In case \(x(t)\) is eventually negative, similar arguments lead to a contradiction with condition (13). □

Theorem 3.3

Let conditions (7) and (8) hold with \(\beta>\gamma \). If

and

for every sufficiently large T, where

then every solution of (1) is oscillatory.

Proof

Let \(x(t)\) be a nonoscillatory solution of equation (1), say \(x(t)>0\) for \(t\geq T_{1}>a\). Let \(s\geq T_{1}\). Using conditions (7) and (8), we get

Let \(X=x^{\gamma}(s)\), \(Y=\frac{\gamma p_{2}(s)}{\beta p_{1}(s)}\), \(u=\frac {\beta}{\gamma}\), and \(v=\frac{\beta}{\beta-\gamma}\), then from part (i) of Lemma 2.1 we get

where H is defined by (22). Then from equation (6) we obtain

The rest of the proof is the same as that of Theorem 3.2 and hence is omitted. □

Theorem 3.4

Let \(\alpha\geq1\) and suppose that (7) and (9) hold with \(\beta< \gamma\). If

and

for every sufficiently large T, where H is defined by (22), then every bounded solution of (1) is oscillatory.

Proof

Let \(x(t)\) be a bounded nonoscillatory solution of equation (1). Then there exist constants \(M_{1}\) and \(M_{2}\) such that

Assume that x is a bounded eventually positive solution of (1). Then there exists \(T_{1} >a\) such that \(x(t)>0\) for \(t\geq T_{1}>a\). Using conditions (7) and (9), we get \(f_{2}(s,x)-f_{1}(s,x)\geq p_{2}(s)x^{\gamma}(s)-p_{1}(s)x^{\beta}(s)\). Using (ii) of Lemma 2.1 and similar to the proof of (23), we find

From (6) and similar to (24), we obtain

Multiplying by \((\frac{t^{\rho}}{\rho} )^{1-\alpha}\), we get

Take \(T_{2} > T_{1}\). We consider two cases as follows.

Case (1): Let \(\alpha=1\). Then (16) and (17) are still correct. Hence, from (28) and using (27), we find that

for \(t\geq T_{2}\). Thus, we get

which contradicts condition (25).

Case (2): Let \(\alpha>1\). Then (18) and (19) are still true. Hence, from (28) and using (27), we find that

for \(t\geq T_{2}\). Since \(\lim_{t \to\infty} (\frac{t^{\rho}}{\rho} )^{1-\alpha}=0\) for \(\alpha>1\), we conclude that

which contradicts condition (25). Therefore, we conclude that \(x(t)\) is oscillatory. In case \(x(t)\) is eventually bounded negative, similar arguments lead to a contradiction with condition (26). □

In this section, we study the oscillation of conformable fractional differential equations in the Caputo setting of the form

where \(m=\lceil\alpha\rceil\) and \({}_{a}^{C}\mathfrak{D}^{\alpha,\rho}\) is defined by (4).

Lemma 4.1

[1] Let \(f \in C_{\rho, a}^{m}[a,b]\), \(\alpha\in\mathbb{C}\). Then

Using Lemma 4.1, the solution representation of (29) can be written as

where \(F(t,x)=r(t)+f_{2}(t,x)-f_{1}(t,x)\) and \(\rho>0\).

Define

Theorem 4.2

Let \(f_{2} =0\) in (29) and condition (7) hold. If

and

for every sufficiently large T, then every solution of (29) is oscillatory.

Proof

Let \(x(t)\) be a nonoscillatory solution of equation (29) with \(f_{2} =0\). Suppose that \(T_{1}>a\) is large enough so that \(x(t)>0\) for \(t\geq T_{1}\). Hence (7) implies that \(f_{1}(t,x)>0\) for \(t\geq T_{1}\). Using (3), we get from (30)

where χ and Ψ are defined in (31) and (11), respectively.

Multiplying (34) by \((\frac{t^{\rho}}{\rho} )^{1-m}\), we get

Take \(T_{2}>T_{1}\). We consider two cases as follows.

Case (1): Let \(0<\alpha\leq1\). Then \(m=1\) and \((\frac{t^{\rho}}{\rho} )^{1-m}\chi(t)=\Gamma(\alpha)b_{0}\).

The function \(h_{4}(t)=(\frac{(t-a)^{\rho}-(s-a)^{\rho}}{\rho})^{\alpha -1}\) is decreasing for \(\rho>0\), \(t>T_{2}>s\), and \(\alpha<1\). Thus, we get

Then, from equation (35) and for \(t\geq T_{2}\), we get

hence

which contradicts condition (32).

Case (2): Let \(\alpha>1\). Then \(m\geq2\). Also, \((\frac {t-a}{t} )^{\rho m-\rho}<1\) for \(m\geq2\) and \(\rho> 0\). The function \(h_{3}(t)=(t-a)^{\rho(k-m+1)}\) is decreasing for \(k< m-1\) and \(\rho>0\). Thus, for \(t\geq T_{2}\), we have

Also, since \((\frac{t^{\rho}}{\rho} )^{1-m}<1\) and \((\frac {(t-a)^{\rho}-(s-a)^{\rho}}{t^{\rho}} )^{\alpha-1}<1\) for \(\alpha>1\) and \(\rho> 0\), and similar to (19) we get

Then, from (35) and (36), we get a contradiction with condition (32). Therefore, we conclude that \(x(t)\) is oscillatory. In case \(x(t)\) is eventually negative, similar arguments lead to a contradiction with condition (33). □

We state the following two theorems without proof.

Theorem 4.3

Let conditions (7) and (8) hold with \(\beta>\gamma \). If

and

for every sufficiently large T, where H is defined by (22), then every solution of (29) is oscillatory.

Theorem 4.4

Let \(\alpha\geq1\) and suppose that (7) and (9) hold with \(\beta< \gamma\). If

and

for every sufficiently large T, where H is defined by (22), then every bounded solution of (29) is oscillatory.

In this section, we construct numerical examples to illustrate the effectiveness of our theoretical results.

Example 5.1

Consider the Riemann conformable fractional differential equation

where \(m=1\), \(f_{1}(t,x)=x^{5}(t)\ln(t+e)\), \(r(t)=\frac{2\rho^{\alpha}(t-a)^{\rho (2-\alpha)}}{\Gamma(3-\alpha)}+ [(t-a)^{10\rho}-(t-a)^{\frac{2}{3}\rho}]\ln(t+e)\), and \(f_{2}(t,x)=x^{\frac{1}{3}}(t)\ln(t+e)\). It is easy to verify that conditions (7) and (8) are satisfied for \(\beta =5\), \(\gamma=\frac{1}{3}\) and \(p_{1}(t)=p_{2}(t)=\ln(t+e)\). However, we show in the following that condition (20) does not hold. For every sufficiently large \(T\geq1\) and all \(t\geq T\), we have \(r(t)>0\). Calculating \(H(s)\) as defined by (22), we find that \(H(s)=14(15)^{-\frac{15}{14}}\ln(s+e) \geq0.77\). Then, using (5) with \(\nu=1\), we get

However, using (5) with \(\nu=3\), one can easily verify that \(x(t)=(t-a)^{2\rho}\) is a nonoscillatory solution of (37). The initial condition is also satisfied because

Example 5.2

Consider the conformable fractional differential equation

where \(f_{1}(t,x)=x^{3}(t)\), \(r(t)=\sin t\), and \(f_{2}(t,x)=0\). Then condition (7) holds. Furthermore, one can easily check that

and

This shows that conditions (12) and (13) of Theorem 3.2 hold. Hence, every solution of (38) is oscillatory.

Example 5.3

Consider the Caputo conformable fractional differential equation

where \(m=1\), \(f_{1}(t,x)=e^{t} x^{3}(t)\), \(r(t)=\frac{\rho^{\alpha}(t-a)^{\rho (1-\alpha)}}{\Gamma(2-\alpha)}\), and \(f_{2}(t,x)=0\). Then condition (7) is satisfied. However, condition (32) does not hold since

Using (2), (5) with \(\nu=2\) and the fact that

one can easily check that \(x(t)=(t-a)^{\rho}\) is a nonoscillatory solution of (39).

Remark 5.1

The oscillation of fractional differential equations in the frame of Katugampola-type fractional derivatives studied in [23–25] can be investigated in a similar way as we have done in this article for CFDs and their Caputo settings. The reader can verify sufficient conditions and the proofs by observing the kernel which is free from the starting point a.

In this article, the oscillation theory for conformable fractional differential equations was studied. Sufficient conditions for the oscillation of solutions of Riemann conformable fractional differential equations of the form (1) were given in three theorems in Sect. 3. As \(\rho\rightarrow1\) in these theorems, we get the results obtained in [13] and [14] when \(a=0\). The main approach is based on applying Young’s inequality which will help us in obtaining sharper conditions. The oscillation for the Caputo conformable fractional differential equations has been investigated as well. Numerical examples have been presented to demonstrate the effectiveness of the obtained results. We shall discuss the case when \(\rho\rightarrow0\) in the future work. Namely, we shall discuss the oscillation of Hadamard-type fractional differential equations with kernels both depending or not depending on the starting point.

The author would like to thank Prince Sultan University for funding this work through research group Nonlinear Analysis Methods in Applied Mathematics (NAMAM) group number RG-DES-2017-01-17.

Authors and Affiliations

1. Department of Mathematics and General Sciences, Prince Sultan University, Riyadh, Saudi Arabia

   Bahaaeldin Abdalla

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The author read and approved the final manuscript.

Corresponding author

Correspondence to Bahaaeldin Abdalla.

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The author declares that he has no competing interests.

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