Existence and uniqueness for a kind of nonlocal fractional evolution equations on the unbounded interval

By means of a Laplace transform and its inverse transform, we obtain a correct equivalent integral equation for some kind of nonlocal abstract differential equations (fractional order) on the right half-axis. Based on it, the existence result is established by Knaster’s theorem, and the uniqueness of the mild solution is obtained using the Banach contraction principle.

Today, fractional order calculus has a great many of uses in engineering, science, economy, biology, physics and other scientific disciplines (see [1,2,3]). Numerous phenomena and processes in the real world are described by differential equations of fractional order. Given their wide applications, there are numerous scholars focusing on the study of the differential equations of fractional order recently. To acquire more general knowledge of fractional order calculus and equations with fractional derivatives, the reader may refer to [4,5,6,7,8,9,10,11,12,13,14,15,16,17,18,19,20,21,22,23,24,25,26,27,28].

Now, nonlocal evolution equations of fractional order have become one of the hot research topics in the field of differential equations with fractional derivatives, which play a role in modeling physics phenomena. For the first time, the existence of mild solutions for the nonlocal problems was discussed in [29]. In [30], Byszewski and Lakshmikantham indicated that as regards describing physical phenomena nonlocal conditions could be more applicable than standard conditions.

In [19], El-Borai obtained the existence results for fractional abstract equations of the following kind:

where \(0<\beta \leq 1\), \(a>0\).

In this paper, the equivalent integral equation in regard to the abstract equations is firstly described by means of some probability densities using Laplace transform and its inverse transform. Since then, many researchers have drawn on El-Borai’s results to investigate fractional evolution equations, such as in [20,21,22,23,24,25,26,27,28].

To the best of our knowledge, fractional evolution equations have attracted more and more attention recently [18,19,20,21,22,23,24,25,26,27,28]. For instance, in [20], Zhou investigated a class of nonlocal evolution equations of fractional order

Zhou and Jiao obtained many good conclusions about the existence and uniqueness of mild solution for this equation.

Yet despite all that, a fair number of those papers investigating the mild solutions of evolution equations with fractional derivatives are concerned with bounded intervals, and conclusions on the right half-axis are still rare.

Motivated by [19, 20, 31], we discuss a class of nonlocal functional differential equations of fractional order in a Banach space E

where \(0< q < 1\), \({}^{C}D_{0+}^{q}\) denotes the fractional derivative in the Caputo sense, \(u_{0}\in E\), \(\{T(t)\}_{{t\geq 0}} \) is a \(C_{0}\) semigroup on Banach E and A is the semigroup’s infinitesimal generator, \(m\in C[0,\infty )\), \(m(t)\geq 0\) is an increasing function, \(f:[0,+\infty )\times E\rightarrow E\), and \(k:E\rightarrow E\) satisfy certain conditions.

Here, entirely different from those already obtained in the previous literature, we obtain a correct equivalent integral equation for the main equation. Applying Knaster’s theorem, the existence of positive mild solutions of the main problem (1.1) is given. Then, employing the Banach contraction theorem, the uniqueness of the mild solution is given.

The layout of the rest of the article is listed now. In Sect. 2, fractional derivative, fractional integral and several useful preliminaries are introduced. In Sect. 3, our main conclusions are presented by using Knaster’s theorem and Banach contraction theorem, respectively. In Sect. 4, one example is provided to show the application of our main conclusion.

In the following, we assume that E is ordered Banach space. Let \(P\subset E\) be a cone, which defines a partial order by \(y\leq z\) if and only if \(z-y \in P\) on E. We refer the reader to [32, 33] for more details as regards the cone.

Throughout the paper, we set a normal positive cone \(P=\{z\in E \mid z\geq \theta \}\) with N as its normal constant. Let

Evidently, it is a Banach space equipped with the norm \(\Vert v \Vert _{{b}}=\sup_{{t\in J}}\Vert v(t) \Vert \). Set

Obviously, \(P_{{BC}}\) is a normal cone in \(BC(J,E)\) with the normal constant N, the same normal to the cone P. Meanwhile, an ordered Banach space \(BC(J,E)\) is induced by \(P_{{BC}}\) (for convenience, we also denote the partial order by “≤” both on \(BC(J,E)\) and on E without confusion).

Let \(\mathcal{S}\subset E\) be a subset such that

The point \(z^{*}\in E\) is called the infimum of \(\overline{\mathcal{S}}\) if \(z^{*}\in \overline{\mathcal{S}}\) and for each \(z\in \overline{\mathcal{S}}\), \(z^{*}\leq z\).

Similarly, we can define the supremum of \(\overline{\mathcal{S}}\) by reversing the inequality in the above definition.

Next, we present the theorem established by Knaster [34].

Theorem 2.1

([34])

Let E be a Banach space ordered by partially ordering “⪯”. Assume that \(\mathcal{S}\subset E\) is a subset of E, which has properties as follows: (1) Each nonempty subset of \(\mathcal{S}\) has a supremum belonging to \(\mathcal{S}\); (2) The infimum of \(\mathcal{S}\) is in \(\mathcal{S}\). Assume that the map \(T:\mathcal{S}\rightarrow \mathcal{S}\) is increasing, i.e., \(y\preceq z\) implies that \(Ty\preceq Tz\) (\(y,z\in \mathcal{S}\)). Then T has a fixed point in \(\mathcal{S}\).

Next, we list two definitions of fractional integral and fractional derivative and one lemma, which will be used.

Definition 2.1

([1,2,3])

The fractional integral of order \(\alpha >0\) in the sense of Riemann–Liouville for a function \(g:(0, \infty )\rightarrow \mathbb{R}\) is defined by

provided that the integral above is pointwise defined on \((0, \infty )\).

Definition 2.2

([1,2,3])

The fractional derivative of order \(\alpha >0\) in the sense of Caputo for a function \(g:(0, \infty )\rightarrow \mathbb{R}\) is defined by

where \(n=[\alpha ]+1\), provided that the integral above is pointwise defined on \((0, \infty )\).

Lemma 2.1

([1, 3])

Let \({}^{C}D^{\alpha }_{0+}g(t) \in L^{1}(0,+\infty )\), \(\alpha >0\). Then one has

for some constants \(C_{i}\), \(i=1, 2, 3,\ldots ,M\) , where \(M=\min \{m \mid m\geq \alpha ,m\textit{ is a integer}\}\).

Remark 2.1

If the function g appearing in the above lemma and two definitions takes values in the Banach space E, then the integrals here are all to be taken in the sense of Bochner. In addition, if the abstract function g is measurable and its norm is integrable in the sense of Lebesgue, it is Bochner integrable.

Next, we set out to present a series of concepts and results about the semigroups of linear operators. The reader can find more details in [35, 36].

Given a strongly continuous semigroup \(\{T(t)\}_{{t}\geq 0}\) (i.e. \(C_{0}\)-semigroup), we can define the infinitesimal generator of \(\{T(t)\}_{{t\geq 0}}\) as

The domain of A is given by

Lemma 2.2

([35, 36])

Assume that \(\{T(t)\}_{{t}\geq 0}\) is a strongly continuous semigroup, then \(\Vert T(t) \Vert \leq C e^{\omega t}\), where ω and \(C\geq 1\) are two constants.

Lemma 2.3

([35, 36])

Given a strongly continuous semigroup of contractions \(\{T(t)\}_{{t}\geq 0}\) and a linear operator A, we have the following results: A is the infinitesimal generator of \(\{T(t)\}_{{t}\geq 0}\) if and only if

1. (1)

   \(\overline{D(A)}=E\) and A is closed.

2. (2)

   \((0,+\infty )\subset \rho (A)\), and \(\forall \mu >0\), one has

   $$ \bigl\Vert R(\mu ,A) \bigr\Vert \leq \frac{1}{\mu }, $$

   where \(\rho (A)\) is the resolvent set of A, and

   $$ R(\mu ,A)z:=(\mu I-A)^{-1}z= \int _{0}^{+\infty }e^{-\mu t}T(t)z\,dt, \quad z\in E. $$

Definition 2.3

([37])

For a given strongly continuous semigroup \(\{T(t)\}_{{t\geq 0}}\), it is positive on E, if \(\theta \leq T(t)z\), \(t\geq 0\), \(z\in E\).

Definition 2.4

([35, 36])

For a given strongly continuous semigroup \(\{T(t)\}_{{t\geq 0}}\), it is uniformly exponentially stable under the condition that \(\omega _{0}<0\), where \(\omega _{0}\) denotes the growth bound of the semigroup, and it is given by

By Definition 2.4 and Lemma 2.2, for a uniformly exponentially stable \(C_{0}\)-semigroup \(\{T(t)\}_{{t\geq 0}}\), \(\Vert T(t) \Vert \leq C e^{\omega t}\), \(t\geq 0, C\geq 1\) and \(\omega \in (0,|\omega _{0}|]\) (\(\omega _{0}\) is the growth bound of the above semigroup). Next, define a norm on E as follows:

Obviously, one has \(\Vert z \Vert \leq \Vert z \Vert _{\omega }\leq C \Vert z \Vert \), which implies that \(\Vert \cdot \Vert \) and \(\Vert \cdot \Vert _{\omega }\) are equivalent norms. Denote by \(\Vert T(t) \Vert _{\omega }\) the norm of \(T(t)\) which is induced by \(\Vert \cdot \Vert _{\omega }\), then, for each \(t\geq 0\), we obtain

Meanwhile, it is easy to verify that the norm

is an equivalent one on \(BC(J,E)\). Evidently, if \(v(t)\equiv v_{0}, t\in J\), \(v_{0}\in E\), then we have

Given the stable probability density of one-sided [20, 21, 38]

where \(0< q<1\). Noting Remark 2.8 in [21], if \(\beta \in [0,1]\), we have

From [20, 21, 38], the Laplace transform of \(\psi _{q}(\theta )\) is

In the remaining part, we show that the semigroup \(\{T(t)\}_{{t\geq 0}}\) is strongly continuous of contractions and is uniformly exponentially stable with the growth bound \(\omega _{0}\), and \(\omega \in (0,|\omega _{0}|]\).

Lemma 2.4

Define an operator

Thus, \(\mathcal{J}\) maps \(BC(J,E)\) into \(BC(J,E)\) and

In particular, if \(h(t)\equiv x\), \(t\in J\), \(x\in E\), then

Proof

Since

the proof is finished. □

Lemma 2.5

Set

Thus, \(\mathcal{K}\) maps \(BC(J,E)\) into \(BC(J,E)\) and

Proof

Since

we have

Therefore,

 □

Lemma 2.6

The evolution equation of fractional order

where \(h \in BC(J,E)\) and \(u_{0}\in D(A)\), has a unique solution in \(BC(J,E)\)

Proof

By Lemma 2.1, Definition 2.1, and Definition 2.2, (2.8) is equivalent with the following integral equation:

By a similar method used in [18, 19], after Laplace transformation of the above equation, we can get

where \(H(\lambda )\) and \(U(\lambda )\) are the Laplace transform of \(h(t)\) and \(u(t)\), respectively.

Then one has

From Lemma 2.3 and (2.6), we obtain

Taking the inverse Laplace transforms on the above equations, according to the convolution theorem and Lemma 2.5, we have

Since

we have

Hence, \(u\in BC(J,E)\). □

In consequence, it leads to the conclusion.

Lemma 2.7

The main equation (1.1) can be written in the equivalent form

It is obvious that problem (1.1) has a mild solution if T has a fixed point.

In the part, we give the main conclusions about the existence of mild solutions for the main equation on the right half-axis.

First, we give the result about the existence of positive mild solutions for problem (1.1).

Theorem 3.1

Assume that the normal cone P is positive in the Banach space E with the normal constant N. We assume that semigroup \(\{T(t)\}_{{t\geq 0}}\) is strongly continuous and is uniformly exponentially stable with the growth bound \(\omega _{0} (\omega _{0}<0)\), and the infinitesimal generator of \(\{T(t)\}_{{t\geq 0}}\) is the operator A. Let \(m\in C[0,\infty )\) and \(m(t)\) is increasing and non-negative. Provided that \(u_{0}\in P, u_{0}\neq \theta \), \(f(t,u):J\times E\longrightarrow E\), \(f_{0}(t):=f(t,\theta )\geq \theta \) is bounded on J, \(k(u)\) maps E into E, both \(f(t,u)\) and \(k(u)\) are continuous. If \(k(u)\) and \(f(t,u)\) satisfy:

1. (F1)

   for any \(t\in J\),

   $$ f(t,z)\geq f(t,y), \quad \forall \theta \leq y\leq z. $$
2. (F2)

   For a given \(\omega _{1}\in (0,\vert \omega _{0} \vert ]\), there exists a positive number R such that

   $$ \Vert u_{0} \Vert _{{b}}+\frac{1}{\omega _{1}}\frac{1}{\varGamma {(q+1)}} R_{f}\leq R, $$

   where

   $$ R_{f}=\sup_{s\in J, 0\leq \Vert z \Vert _{{b}}\leq R}\bigl\Vert f(s,z) \bigr\Vert _{{b}}< +\infty . $$
3. (F3)
   $$ \theta \leq k(y)\leq k(x)\leq u_{0}, \quad \forall \theta \leq x\leq y. $$

Thus, there exists a positive mild solution for Eq. (1.1) in \(BC(J,E)\).

Proof

Define a nonempty subset of \(BC(J,E)\)

By (F1), \(\forall u\in \mathcal{D}\), one has

Then, combined with Lemma 2.4 and Lemma 2.5, one has

Thus,

From condition (F2), one can get

which shows that \(T(\mathcal{D})\subseteq \mathcal{D}\).

From condition (F1) and (F3), it is obvious that T maps \(\mathcal{D}\) into \(\mathcal{D}\) and it is also an increasing mapping. Then, applying Theorem 2.1, the map T possesses a fixed point in the nonempty set \(\mathcal{D}\). Thus, Eq. (1.1) has a positive mild solution in \(BC(J,E)\). □

Corollary 3.1

Assume that the normal cone P is positive in the Banach space E with the normal constant N. Provided that semigroup \(\{T(t)\}_{{t\geq 0}}\) is strongly continuous and is uniformly exponentially stable with the growth bound \(\omega _{0}\) (\(\omega _{0}<0\)), and the infinitesimal generator of \(\{T(t)\}_{{t\geq 0}}\) is the operator A. Let \(m\in C[0,\infty )\) and \(m(t)\) be increasing and non-negative. Provided that \(u_{0}\in P, u_{0}\neq \theta \), \(f(t,u):J\times E\longrightarrow E\) is continuous and bounded, \(f_{0}(t):=f(t,\theta )\geq \theta \), and \(k(u): E\longrightarrow E\) is continuous. If \(f(t,u)\) and \(k(u)\) satisfy the conditions \((F1)\) and \((F3)\), respectively, there exists a positive mild solution for Eq. (1.1) in \(BC(J,E)\).

Proof

Since \(f(t,u)\) is bounded and continuous on \(J\times E\), condition (F2) is fulfilled, then Theorem 3.1 implies that there is a positive mild solution of Eq. (1.1) in \(BC(J,E)\). □

Theorem 3.2

Provided that \(\{T(t)\}_{{t\geq 0}}\) (the semigroup of operators on Banach space E) is strongly continuous and is uniformly exponentially stable with the growth bound \(\omega _{0}\) (\(\omega _{0}<0\)), and the infinitesimal generator of \(\{T(t)\}_{{t\geq 0}}\) is the operator A. Assume that \(m(t)\geq 0\) and \(m\in C[0,\infty )\). If \(f(t,u)\) and \(k(u)\) satisfy:

1. (H1)

   For a given \(\omega ^{*}\in (0,\vert \omega _{0} \vert ]\), we have two positive numbers \(\mathcal{C}_{f}\) and \(\mathcal{C}_{k}\) satisfying \(\mathcal{M}<\omega ^{*}/\chi \) such that

   $$ \mathcal{C}_{f} \Vert z_{1}-z_{2} \Vert _{{\omega ^{*}}}\geq \bigl\Vert f(t,z_{1})-f(t,z_{2}) \bigr\Vert _{{\omega ^{*}}},\quad \forall z_{1}, z_{2}\in E, $$

   and

   $$ \mathcal{C}_{k} \Vert z_{1}-z_{2} \Vert _{{\omega ^{*}}}\geq \bigl\Vert k(z_{1})-k(z_{2}) \bigr\Vert _{{\omega ^{*}}}, \quad \forall z_{1}, z_{2}\in E. $$
2. (H2)
   $$ \mathcal{L}_{kf}:=\mathcal{C}_{k}+\frac{1}{\omega ^{*}} \frac{\mathcal{C}_{f}}{\varGamma {(q+1)}}< 1. $$

Thus, one has a unique mild solution for Eq. (1.1) in \(BC(J,E)\).

Proof

By condition (H1), Lemma 2.4, Lemma 2.5, and Lemma 2.7, ∀v, \(u\in BC(J,E)\), one has

Therefore,

Then, according to condition (H2), Eq. (1.1) has a unique mild solution. □

In order to certify the effectiveness of the main conclusion, an example is given in the following. Consider the following partial differential equation of fractional order.

Example 4.1

where \(\partial ^{q}_{t}\) (\(q\in (0,1)\)) is fractional partial derivative of fractional order in the Caputo sense.

Set \(E=L^{2}([0,\pi ],\mathbb{R})\) and \(Az=\partial ^{2}_{x}z\), in view of [39], we can conclude that A is a linear operator mapping \(D(A)\) into E, and the domain \(D(A)= \{v \mid v(0)=v(\pi )=0, v'\in E, v\in E \}\). In addition, the operator A generates a semigroup \(\{T(t)\}_{{t\geq 0}}\), which is strongly continuous and uniformly exponentially stable. Denote \(\omega _{0}\) as the growth bound of \(\{T(t)\}_{{t\geq 0}}\), then we can get \(\omega _{0}\leq -1\).

Set \(v(t)=z(t,\cdot )\), \(v_{0}=z_{0}\), \(g(t,m(v(t)))=F(t,z(t,\cdot ))\). At this point, the above problem can be written as

Consider the function

and

Take \(q=1/2\), \(v_{0}=3\) and \(m(v)=v^{2}\).

Then the conditions of Theorem 3.1 are all fulfilled. Therefore, there one has a positive mild solution for Eq. (4.1).

Here, using Laplace transform and its inverse transform, we obtain a correct equivalent integral equation for some kind of nonlocal abstract differential equations (fractional order) on the right half-axis, which is different from those given in the existing literature. According to this equivalent integral equation as obtained above, we investigate a kind of abstract fractional order differential equations. By using Knaster’s theorem, we get the existence of positive mild solution for the main equation, and the uniqueness of a mild solution by the Banach contraction theorem.

Acknowledgements

The authors are grateful to the referees for their careful reading of the manuscript. The authors thank the help from the editor.

Availability of data and materials

Not applicable.

This research is supported by the National Natural Science Foundation of China (No. 71672195, 11601508), and supported by Science Fund for Creative Research Groups of the National Natural Science Foundation of China (No. 71221061).

Authors and Affiliations

1. School of Business, Central South University, Changsha, P.R. China

   Zhanmei Lv & Yanping Gong

2. School of Mathematics, China University of Mining and Technology, Xuzhou, P.R. China

   Yi Chen

Contributions

All of the authors contributed equally in writing this paper. They both read and approved the final manuscript.

Corresponding author

Correspondence to Yanping Gong.

Competing interests

The authors declare that they have no competing interests.

Publisher’s Note

Springer Nature remains neutral with regard to jurisdictional claims in published maps and institutional affiliations.

Open Access This article is distributed under the terms of the Creative Commons Attribution 4.0 International License (http://creativecommons.org/licenses/by/4.0/), which permits unrestricted use, distribution, and reproduction in any medium, provided you give appropriate credit to the original author(s) and the source, provide a link to the Creative Commons license, and indicate if changes were made.

Reprints and permissions