Weighted Stepanov-like pseudo-almost automorphic mild solutions for semilinear fractional differential equations

This work is concerned with the existence and uniqueness of weighted Stepanov-like pseudo-almost automorphic mild solutions for a class of semilinear fractional differential equations, \(D_{t}^{\alpha}x(t)=Ax(t)+D_{t}^{\alpha-1}F(t,x(t))\), \(t\in \mathbb{R}\), where \(1<\alpha<2\), A is a linear densely defined operator of sectorial type of \(\omega<0\) on a complex Banach space X and F is an appropriate function defined on phase space. The fractional derivative is understood in the Riemann-Liouville sense. The results obtained are utilized to study the existence and uniqueness of weighted Stepanov-like pseudo-almost automorphic mild solutions for a fractional relaxation-oscillation equation.

In this paper, we are concerned with the existence and uniqueness of weighted Stepanov-like pseudo-almost automorphic mild solutions for the following semilinear fractional differential equations:

where \(1<\alpha<2\),

is a linear densely defined operator of sectorial type of \(\omega<0\) on a complex Banach space X, and

is an appropriate function. The fractional derivative is understood in the Riemann-Liouville sense.

The almost periodic function was introduced seminally by Bochner in 1927 [1]. It plays an important role in describing the phenomena that are similar to the periodic oscillations which can be observed frequently in many fields, such as celestial mechanics, nonlinear vibration, electromagnetic theory, plasma physics, engineering, ecosphere, and so on [2–4]. In mathematics, the almost periodic functions are closely connected with harmonic analysis, differential equations, dynamical systems, and so on [5], they are the generalization of continuous periodic and quasi-periodic functions. In the last several decades, the basic theories on the almost periodic functions have been well developed [5–7], and been applied successfully to the investigation of almost periodic dynamics produced by many different kinds of differential equations [8–15], and they have been some of the most attractive topics in the qualitative theory of differential equations for nearly century because of their significance and applications in areas such as physics, mathematical biology, control theory, and other related fields. As a result, several concepts were introduced as generalizations or restrictions of almost periodicity, such as asymptotic almost periodicity, pseudo-almost periodicity, weighted pseudo-almost periodicity, Stepanov-like almost periodic, Stepanov-like pseudo-almost periodic and weighted Stepanov-like pseudo-almost periodic (see, for example, [16–22]; see Table 1 and the references cited therein for more details).

In the earlier 1960s, Bochner introduced the concept of almost automorphic function [23–26] in relation to some aspects of differential geometry. The notion of almost automorphic function was introduced to avoid some assumptions of uniform convergence that arise when using almost periodic function, it is an important generalization of the classical almost periodic function. From that time the theory of almost automorphic function has been studied by numerous authors, and it also has become one of the most attractive topics in the qualitative theory of differential equations because of its significance and applications. Meanwhile, stimulated by [23–26], many interesting generalizations of the almost automorphic function have been introduced, including asymptotic almost automorphy by N’Guérékata [27], pseudo-almost automorphy by Xiao et al. [28], weighted pseudo-almost automorphy by Blot et al. [29], Stepanov-like almost automorphy by Casarino [30], Stepanov-like pseudo-almost automorphy by Diagana [31] and weighted Stepanov-like pseudo-almost automorphy by Xia and Fan [32]. The generalizations of almost automorphy follow closely a historical development very similar to that of almost periodicity and more and more general types of almost automorphy are developed (see Table 2 and the references cited therein for more details). The relationship between the various types of almost periodicity and almost automorphy is depicted in Figure 1.

Relationship between almost periodic, automorphic functions, and their extensions, where ‘→’ denotes the subset relation ‘⊂’.

Full size image

In recent years, the theory of almost automorphy and its various extensions have attracted a great deal of attention of many mathematicians due to their significance and applications in physics, mathematical biology, control theory, and so on. The existence, uniqueness, and stability of almost automorphic solution have been one of the most attractive topics in the context of various kinds of abstract differential equations [33, 34], partial differential equations [35, 36], functional differential equations [37, 38], integro-differential equations [39] and general dynamic systems [40]. For more on these studies and related issues, we refer the reader to the references cited therein. In connection with differential equations, the great importance from both the applied and the theoretical point of view of the existence of periodic solutions is well known. However, either because models are only an approximation of reality or due to numerical errors, in practice it is impossible to verify whether a solution is exactly periodic. The concept of Stepanov-like almost automorphic function allows relaxing some assumptions to obtain solutions that have properties similar to those of a periodic function. Meanwhile, the applications of the new theory for these generalized functions, especially the Stepanov-like almost automorphic function, to various types of linear, semilinear as well as nonlinear differential equations were studied extensively (see, e.g., [29, 31, 41–53] and references therein).

In recent years, fractional differential equations have gained considerable interest due to their applications in various fields of science such as physics, mechanics, chemistry engineering etc. Significant development has been made in ordinary and partial differential equations involving fractional derivatives, we only enumerate here the monographs of Kilbas et al. [54, 55], Diethelm [56], Hilfer [57], Podlubny [58] and the papers of Agarwal et al. [59, 60], Benchohra et al. [61, 62], El-Borai [63], Lakshmikantham et al. [64–67], Mophou et al. [68–71], N’Guérékata [72], and the references therein.

Meanwhile due to their applications in fields of science where characteristics of anomalous diffusion are presented, type (1) equations are attracting increasing interest (cf. [73–75] and references therein). For example, anomalous diffusion in fractals [74] or in macroeconomics [76] has been recently well studied in the setting of fractional Cauchy problems like (1). While the study of almost automorphic mild solutions to (1) in the borderline case \(\alpha=1\) was well studied in [77, 78]. In [79] Cuevas and Lizama considered (1) when \(1<\alpha<2\) and A is a linear operator of sectorial negative type on a complex Banach space, under suitable conditions on F, the authors proved the existence and uniqueness of an almost automorphic mild solution to (1). Cuevas et al. [80] and [81] study, respectively, the pseudo-almost periodic and pseudo-almost periodic of class infinity mild solutions to (1) assuming that \(F: \mathbb{R} \times X\rightarrow X\) is a pseudo-almost periodic and pseudo-almost periodic of class infinity functions satisfying some appropriate conditions in \(x\in X\). See also [82, 83] where the S-asymptotically ω-periodic solutions to (1) are studied. Recently, Agarwal et al. [84] studied the existence and uniqueness of a weighted pseudo-almost periodic mild solution to (1), and Cao et al. [85] studied the existence of anti-periodic mild solutions to (1).

From Figure 1, we know that the weighted Stepanov-like pseudo-almost automorphic function is the most widely used function of the almost periodic type functions, and to the best of our knowledge, the existence of weighted Stepanov-like pseudo-almost automorphic mild solutions for the semilinear fractional differential equation (1) is a subject that has not been treated in the literature. Our purpose in this paper is to establish some results concerning the existence and uniqueness of weighted Stepanov-like pseudo-almost automorphic mild solutions for equations that can be modeled in the form (1). Upon making some appropriate assumptions, some sufficient conditions for the existence and uniqueness of weighted Stepanov-like pseudo-almost automorphic mild solutions to (1) are given. In particular, as application, and to illustrate our main results, we will examine some sufficient conditions for the existence and uniqueness of weighted Stepanov-like pseudo-almost automorphic mild solutions to the fractional relaxation-oscillation equation given by

with boundary conditions

where F satisfies some additional conditions.

The rest of this paper is organized as follows. In Section 2 we recall some concepts and prove some preliminary results. The section that follows contains the main results of this paper with four existence and uniqueness theorems. In the last section, we prove the existence and uniqueness of weighted Stepanov-like pseudo-almost automorphic mild solutions for a fractional relaxation-oscillation equation as an example to illustrate our main results.

We begin this section by giving some notations. Throughout this paper, let \(p\in[1,\infty)\), denote by ℕ, ℤ and ℝ the set of positive integers, the set of integers and the set of real numbers, respectively. Let \((X,\|\cdot\|)\), \((Y,\|\cdot\|_{Y})\) be two Banach spaces. Let \(BC(\mathbb{R}, X)\) (respectively, \(BC(\mathbb{R} \times Y, X)\)) denote the space of bounded continuous functions with supremum norm

(respectively, the space of jointly bounded continuous functions). By \(L(Y, X)\) we denote the Banach space of all bounded linear operators from Y to X. If \(Y=X\), it is simply denoted by \(L(X)\).

Now, let us recall some basic definitions and results on almost automorphic functions.

Definition 2.1

(Bochner [1])

A continuous function \(f: \mathbb{R}\rightarrow X\) is said to be almost automorphic if for every sequence of real numbers \(\{s'_{n}\}_{n=1}^{\infty}\), one can extract a subsequence \(\{s_{n}\}_{n=1}^{\infty}\) such that

is well defined in \(t\in\mathbb{R}\), and

for each \(t\in\mathbb{R}\).

Denote by \(AA(\mathbb{R}, X)\) the set of all such functions.

Definition 2.2

[1]

A continuous function

is said to be almost automorphic if \(f(t, x)\) is almost automorphic in \(t\in\mathbb{R}\) uniformly for all \(x\in K\), where K is any bounded subset of Y.

Denote by \(AA(\mathbb{R}\times Y, X)\) the set of all such functions.

Remark 2.1

The function g in Definition 2.1 is measurable but not necessarily continuous. Moreover, if g is continuous, then f is uniformly continuous (cf., e.g., [86], Theorem 2.6). If the convergence in Definition 2.1 is uniform in \(t\in\mathbb{R}\), then f is almost periodic. A classical example of almost automorphic function (not almost periodic) is (cf. [45, 46])

Next, let us recall some definitions and basic results on Stepanov-like almost automorphic functions (for more details, see [87]).

Definition 2.3

The Bochner transform

of a function \(f:\mathbb{R}\rightarrow X\) is defined by

Definition 2.4

Let \(p\in[1,\infty)\). The space \(BS^{p}(\mathbb{R}, X)\) of all Stepanov bounded functions, with the exponent p, consists of all measurable functions \(f: \mathbb{R}\rightarrow X\) such that

This is a Banach space with the norm

Definition 2.5

The space \(S^{p}AA(\mathbb{R}, X)\) of Stepanov-like almost automorphic functions consists of all \(f\in BS^{p}(\mathbb{R}, X)\) such that

That is, a function \(f\in L^{p}_{\mathrm{loc}}(\mathbb{R}, X)\) is said to be Stepanov-like almost automorphic if its Bochner transform

is almost automorphic in the sense that for every sequence of real numbers \(\{s'_{n}\}_{n=1}^{\infty}\), there exist a subsequence \(\{s_{n}\}_{n=1}^{\infty}\) and a function \(g\in L^{p}_{\mathrm{loc}}(\mathbb{R}, X)\) such that

and

as \(n\rightarrow\infty\) for all \(t\in\mathbb{R}\).

Definition 2.6

A function

with

for each \(x\in Y\) is said to be Stepanov-like almost automorphic in \(t\in\mathbb{R}\) uniformly for \(x\in Y\), if \(t\rightarrow f(t, x)\) is Stepanov-like almost automorphic for each \(x\in Y\). That is, for every sequence of real numbers \(\{s'_{n}\}_{n=1}^{\infty}\), there exist a subsequence \(\{s_{n}\}_{n=1}^{\infty}\) and a function

such that

and

as \(n\rightarrow\infty\) for all \(t\in\mathbb{R}\) and \(x\in Y\).

Denote by \(S^{p}AA(\mathbb{R}\times Y, X)\) the set of all such functions.

Remark 2.2

It is clear that, if \(x: \mathbb{R}\rightarrow X\) is an almost automorphic function, then x is a Stepanov-like almost automorphic function, that is,

Let U be the set of all functions \(\rho: \mathbb{R}\rightarrow [0,\infty)\) which are positive and locally integrable over ℝ. For a given \(r>0\) and each \(\rho\in U\), set

and the notation \(U_{\infty}\) stands for the set of weight functions

For \(\rho\in U_{\infty}\), define the weighted ergodic space

Definition 2.7

[32]

Let \(\rho\in U_{\infty}\). A continuous function

is said to be weighted Stepanov-like pseudo-almost automorphic (or weighted \(S^{p}\)-pseudo-almost automorphic) if it can be decomposed as

where

In other words, a function

is said to be weighted Stepanov-like pseudo-almost automorphic relatively to the weight \(\rho\in U_{\infty}\), if its Bochner transform

is weighted pseudo-almost automorphic in the sense that there exist two functions \(g, \varphi: \mathbb{R}\rightarrow X\) such that

where

We denote by \(S^{p}WPAA(\mathbb{R}, X)\) the set of all such functions.

Definition 2.8

[32]

Let \(\rho\in U_{\infty}\). A function

with

for each \(x\in Y\) is said to be weighted Stepanov-like pseudo-almost automorphic (or \(S^{p}\)-weighted pseudo-almost automorphic) if it can be expressed as

where

We denote by \(S^{p}WPAA(\mathbb{R}\times Y, X)\) the set of all such functions.

Now we give some lemmas for weighted Stepanov-like pseudo-almost automorphic functions.

Lemma 2.1

[32]

Let \(\rho\in U_{\infty}\). Assume that

is translation invariant. Then the decomposition of a \(S^{p}\)-weighted pseudo-almost automorphic function is unique.

Lemma 2.2

[32]

\(S^{q}WPAA(\mathbb{R}, X, \rho)\subset S^{p}WPAA(\mathbb{R}, X, \rho)\) for \(1\leq p< q <+\infty\).

Lemma 2.3

[32]

Assume that

Then

1. (i)

   \(f_{1}+f_{2}\in S^{p}WPAA(\mathbb{R}, X, \rho)\).

2. (ii)

   \(\lambda f\in S^{p}WPAA(\mathbb{R}, X, \rho)\) for any \(\lambda\in\mathbb{R}\).

3. (iii)

   If

   $$\limsup _{t\rightarrow\infty}\frac{\rho(t+\tau)}{\rho(t)} \quad\textit{and}\quad \limsup _{T\rightarrow\infty} \frac{m(T+|\tau|, \rho )}{m(T, \rho)} $$

   are finite for \(\tau\in\mathbb{R}\), then

   $$f(t-\tau)\in S^{p}WPAA(\mathbb{R}, X, \rho). $$

Lemma 2.4

[32]

Let \(\rho\in U_{\infty}\). The space \(S^{p}WPAA(\mathbb{R}, X, \rho)\) equipped with the norm \(\|\cdot\|_{S^{p}}\) is a Banach space.

Lemma 2.5

[32]

Assume that \(\rho\in U_{\infty}\),

with

and:

1. (i)

   There exist constants \(L_{f}, L_{g}>0\) such that

   $$\bigl\| f(t, x)-f(t, y)\bigr\| \leq L_{f}\|x-y\|,\qquad \bigl\| g(t, x)-g(t, y)\bigr\| \leq L_{g}\|x-y\|,\quad x, y\in X, t\in\mathbb{R}. $$
2. (ii)

   \(h=\alpha+\beta\in S^{p}WPAA(\mathbb{R}, X, \rho)\) with

   $$\alpha^{b}\in AA\bigl(\mathbb{R}, L^{p}\bigl([0, 1], X\bigr) \bigr), \qquad\varphi\in PAA_{0}\bigl(\mathbb{R}, L^{p}\bigl([0, 1], X\bigr)\bigr), $$

   and

   $$K= \overline{\bigl\{ \alpha(t) : t\in\mathbb{R}\bigr\} } $$

   is compact in X.

Then

Lemma 2.6

[32]

Assume that \(\rho\in U_{\infty}\),

with

and:

1. (i)

   There exist nonnegative functions

   $$L_{f} , L_{g}\in S^{r}AA(\mathbb{R}, \mathbb{R}) $$

   with

   $$r\geq\max \biggl\{ p, \frac{p}{p-1} \biggr\} $$

   such that

   $$\bigl\| f(t, x)-f(t, y)\bigr\| \leq L_{f}(t)\|x-y\|, \qquad\bigl\| g(t, x)-g(t, y)\bigr\| \leq L_{g}(t)\|x-y\|, \quad x, y\in X, t\in\mathbb{R}. $$
2. (ii)

   \(h=\alpha+\beta\in S^{p}WPAA(\mathbb{R}, X, \rho)\) with

   $$\alpha^{b}\in AA\bigl(\mathbb{R}, L^{p}\bigl([0, 1], X\bigr) \bigr), \qquad\varphi\in PAA_{0}\bigl(\mathbb{R}, L^{p}\bigl([0, 1], X\bigr)\bigr), $$

   and

   $$K= \overline{\bigl\{ \alpha(t) : t\in\mathbb{R}\bigr\} } $$

   is compact in X.

Then there exists \(q\in[1, p)\) such that

Now we give a lemma.

Lemma 2.7

Let \(\{x_{n}(t)\}_{n\in\mathbb{N}}\) be a sequence of Stepanov-like pseudo-almost automorphic functions such that

as \(n\rightarrow\infty\) for each \(t\in\mathbb{R}\), then

Proof

For any \(i\in\mathbb{N}\) fixed, since

for every sequence of real numbers \(\{s'_{n}\}_{n\in \mathbb{N}}\), there exist a subsequence \(\{s_{n}\}_{n\in \mathbb{N}}\) and a function \(y_{i}\in L^{p}_{\mathrm{loc}}(\mathbb{R}, X)\) such that

as \(n\rightarrow\infty\) for all \(t\in\mathbb{R}\). On the other hand, from (2), one can easily deduce that \(\{x_{n}(t)\}_{n\in\mathbb{N}}\) is a Cauchy sequence with respect to \(\|\cdot\|_{S^{p}}\). Observe that, for each \(t\in\mathbb{R}\), the sequence \(y_{i}\) is also a Cauchy sequence in \(L^{p}_{\mathrm{loc}}(\mathbb{R}, X)\). Indeed, if we write

then for a sufficiently large n, one gets

By (2), (3), and (4), the sequence of \(y_{i}\) is a Cauchy sequence in \(L^{p}_{\mathrm{loc}}(\mathbb{R}, X)\).

Using the completeness of \(L^{p}_{\mathrm{loc}}(\mathbb{R}, X)\), we denote by \(y(t)\) the pointwise limit of \(y_{i}(t)\). Now let us prove that

Note that the inequality below holds for any index i and any \(t\in \mathbb{R}\),

So, from (2) and the fact that \(y(t)\) is the pointwise limit of \(y_{i}(t)\), for any sufficiently small \(\varepsilon>0\) there exists a sufficiently large i, such that for each \(t\in\mathbb{R}\),

Now for this sufficiently large i, from (3) and (4), there exists a sufficient N such that for any \(n>N\) one has

Thus

which implies

as \(n\rightarrow\infty\) pointwise on ℝ. One can use the same steps to prove that

as \(n\rightarrow\infty\) pointwise on ℝ. That is,

The proof is finished. □

We need some basic definitions and properties of the fractional calculus theory which are used further in this paper.

Definition 2.9

[54]

The fractional Riemann-Liouville integral of order \(\alpha>0\) with the lower limit \(t_{0}\) for a function f is defined as

provided the right-hand side is pointwise defined on \([t_{0}, \infty)\), where Γ is the Gamma function.

Definition 2.10

[54]

The Riemann-Liouville derivative of order \(\alpha>0\) with the lower limit \(t_{0}\) for a function \(f: [t_{0}, \infty) \rightarrow\mathbb{R}\) can be written as

Remark 2.3

The first and maybe the most important property of the Riemann-Liouville fractional derivative is that, for \(t>t_{0}\) and \(\alpha>0\), one has

which means that the Riemann-Liouville fractional differentiation operator is a left inverse to the Riemann-Liouville fractional integration operator of the same order α.

In the following, we give the definitions of sectorial linear operators and their associated solution operators.

Recall that a closed and linear operator A is said to be sectorial of type ω and angle θ if there exist

such that its resolvent exists outside the sector

and

Sectorial operators are well studied in the literature, usually for the case \(\omega=0\). For a recent reference including several examples and properties we refer the reader to [88]. Note that an operator A is sectorial of type ω if and only if \(\omega I-A\) is sectorial of type 0.

Definition 2.11

[89]

Let A be a closed and linear operator with domain \(D(A)\) defined on a Banach space X. We call A is the generator of a solution operator if there are \(\omega\in \mathbb{R}\) and a strongly continuous function

such that

and

In this case, \(S_{\alpha}(t)\) is called the solution operator generated by A.

We note that if A is sectorial of type ω with

then A is the generator of a solution operator given by

where γ is a suitable path lying outside the sector \(\omega+\Sigma_{\theta}\) (cf. [88]).

Very recently, Cuesta in [89], Theorem 1, has proved that if A is a sectorial operator of type \(\omega<0\) for some \(M>0\) and

then there exists \(C>0\) such that

for \(t\geq0\). In the border case \(\alpha=1\), this is analogous to saying that A is the generator of an exponentially stable \(C_{0}\)-semigroup. The main difference is that in the case \(\alpha> 1\) the solution family \(S_{\alpha}(t)\) decays like \(t^{-\alpha}\). Cuesta’s result proves that \(S_{\alpha}(t)\) is, in fact, integrable.

Now we give another lemma.

Lemma 2.8

Assume that (6) is true. Given a function

Let

Then \([\Phi F](t)\) is weighted Stepanov-like pseudo-almost automorphic.

Proof

Firstly, note that

By condition (6), one has

Thus, Φ is well defined and ΦF is bounded. On the other hand, for any \(t, h\in\mathbb{R}\),

which shows that ΦF is continuous. Since

there exist

such that \(F=G+\Phi\). So

We only need to verify

First we prove that

Let \(\{s'_{m}\}_{m\in\mathbb{N}}\) be a sequence of real numbers. Since

there exist a subsequence \(\{s_{m}\}_{m\in\mathbb{N}}\) of \(\{s'_{m}\}_{m\in\mathbb{N}}\) and a function \(\tilde{G}\) such that

as \(m\rightarrow\infty\) pointwise on ℝ for each \(x\in X\). Let

Thus

From (7), (8), and (9), obviously, the last inequality goes to 0 as \(m\rightarrow\infty\) pointwise on ℝ. Similarly one can prove that

as \(m\rightarrow\infty\) pointwise on ℝ. Thus we conclude that

In the following, we prove that

To complete the proof, consider for each \(n=1, 2,\ldots \) , the integrals

for each \(t\in\mathbb{R}\). Note that

and by using the Hölder inequality, one gets

From \(1<\alpha<2\), it follows that

one can deduce from the well-known Weierstrass test that the series

is convergent in the sense of the norm \(\|\cdot\|_{S^{p}}\) uniformly on ℝ. Now let

Observe that

Clearly, for any \(t, h\in\mathbb{R}\),

which shows that Δ is continuous. So, we only need to show that

In fact, one has

where \(q=p/(p-1)\). Then

and hence

since

From

and

it follows that

Therefore,

The proof is now complete. □

Let \(1<\alpha<2\). We first consider the linear version for (1), that is

Observe that (10) can be viewed as the limiting equation for the equation

in the sense that the solutions \(x(t)\) of (10) and \(y(t)\) of (11) are asymptotic to each other as \(t\rightarrow\infty\). In fact, if we assume that A is sectorial of type ω with

then (11) is well posed (cf. [88]) and the variation of parameters formula allows us to write the solution of (11) as

where the family of operators \(S_{\alpha}(t)\) is given by (5). On the other hand, if \(S_{\alpha}(t)\) is integrable, then the solution of (10) is given by

Hence

which shows that

whenever \(F\in L^{p}(\mathbb{R}^{+}, X)\) for some \(p\in[1,+\infty)\).

From Cuesta’s result, it follows that \(S_{\alpha}(t)\) is integrable. Thus the above considerations motivate the following definition.

Definition 3.1

A function \(x: \mathbb{R}\rightarrow X\) is said to be a mild solution to (10) if the function

is integrable on \((-\infty, t)\) for each \(t\in\mathbb{R}\) and

Similarly, a function \(x: \mathbb{R}\rightarrow X\) is said to be a mild solution to (1) if the function

is integrable on \((-\infty, t)\) for each \(t\in\mathbb{R}\) and

To study the existence and uniqueness of weighted Stepanov-like pseudo-almost automorphic mild solutions to (1), we first consider the existence and uniqueness of weighted Stepanov-like pseudo-almost automorphic mild solutions to the linear fractional differential equation (10) with \(1<\alpha<2\),

is a linear densely defined operator of sectorial type of \(\omega<0\) on a complex Banach space X and

is a weighted Stepanov-like pseudo-almost automorphic function. The fractional derivative is understood in the Riemann-Liouville sense.

The following are the main results for the linear fractional differential equations (10).

Theorem 3.1

Assume that A is sectorial of type \(\omega<0\). Then (10) admits a weighted Stepanov-like pseudo-almost automorphic mild solution.

Proof

Since

there exist

such that \(F=G+\Phi\). So

We only need to verify

First we prove that

Consider for each \(n=1, 2,\ldots \) , the integrals

for each \(t\in\mathbb{R}\). Note that

and by using the Hölder inequality, one gets

From \(1<\alpha<2\), it follows that

one can deduce from the well-known Weierstrass test that the series

is convergent in the sense of the norm \(\|\cdot\|_{S^{p}}\) uniformly on ℝ. Now let

Observe that

Clearly, for any \(t, h\in\mathbb{R}\),

which shows that Φ is continuous.

Now let us show that each

Indeed, let \(\{s'_{m}\}_{m\in\mathbb{N}}\) be a sequence of real numbers. Since

there exist a subsequence \(\{s_{m}\}_{m\in\mathbb{N}}\) of \(\{s'_{m}\}_{m\in\mathbb{N}}\) and a function \(\tilde{G}\) such that

as \(m\rightarrow\infty\) pointwise on ℝ. Moreover, if we let

one has

Obviously, the last inequality goes to 0 as \(m\rightarrow\infty\) pointwise on ℝ. Similarly one can prove that

as \(m\rightarrow\infty\) pointwise on ℝ. Thus we conclude that each

and consequently their uniform limit

by using Lemma 2.7.

In the following, we prove that

To complete the proof, consider for each \(n=1, 2,\ldots \) , the integrals

for each \(t\in\mathbb{R}\). Note that

By carrying out similar arguments as above, we know that \(\Theta_{n}(t)\) is bounded and continuous, and

is uniformly convergent on ℝ. Let

then

It is obvious that \(\Psi(t)\) is bounded and continuous. So, we only need to show that

In fact, one has

where \(q=p/(p-1)\). Then

and hence

since

From

and

it follows that

Therefore,

In view of the above, it follows that \(x(t)\) is the bounded weighted Stepanov-like pseudo-almost automorphic mild solution to (10). The proof is now complete. □

Now we investigate the Stepanov-like almost automorphic mild solutions to the nonlinear fractional differential equation (1), the following are the main results.

Theorem 3.2

Assume that A is sectorial of type \(\omega<0\) and \(\rho\in U_{\infty}\). Let

with

and there exist nonnegative functions

with

such that

where

Then (1) admits a unique weighed Stepanov-like pseudo-almost automorphic mild solution.

Proof

Define the operator Γ on \(S^{p}WPAA(\mathbb{R}, X)\) by

From Lemma 2.6, it follows that

From the function

being integrable on \(\mathbb{R}^{+}\) (\(\alpha>1\)) and the proof of Lemma 2.7, one can easily see that Γx is well defined and continuous. Then by using the proof of Theorem 3.1 with the above Lemma 2.8, one has

whenever

Thus Γ maps \(S^{p}WPAA(\mathbb{R}, X)\) into itself. It suffices now to show that this operator Γ has a unique fixed point in \(S^{p}WPAA(\mathbb{R}, X)\). For this, let x, y be in \(S^{p}WPAA(\mathbb{R}, X)\) and define

one has

In general we get

Hence, since

for n sufficiently large, by the contraction principle Γ has a unique fixed point

We note that conditions of type (13) have been previously considered in the literature for almost automorphic functions [90]. Our motivation comes from their use in the study of pseudo-almost periodic solutions of semilinear Cauchy problems [91]. Now we consider the more general case of equations introducing a new class of functions L which do not necessarily belong to \(L^{p}(\mathbb{R})\). We have the following result. □

Theorem 3.3

Assume that A is sectorial of type \(\omega<0\) and \(\rho\in U_{\infty}\). Let

with

and there exist nonnegative functions

with

such that

where the integral

exists for all \(t\in\mathbb{R}\). Then (1) admits a unique weighed Stepanov-like pseudo-almost automorphic mild solution.

Proof

Define a new norm

where

and k is a fixed positive constant greater than

Let x, y be in \(S^{p}WPAA(\mathbb{R}, X)\), then one has

Hence, since

Γ has a unique fixed point

Note that the above result does not include the cases where \(L_{F}\) and \(L_{G}\) are constants. □

Theorem 3.4

Assume that A is sectorial of type \(\omega<0\) and \(\rho\in U_{\infty}\). Let

with

and there exist constants \(L_{F}\), \(L_{G}\) such that

Then (1) admits a unique Stepanov-like pseudo-almost automorphic mild solution whenever

Proof

For \(x, y\in S^{p}WPAA(\mathbb{R}, X)\), one has

This proves that Γ is a strict contraction, so it follows from the Banach contraction mapping principle that Γ admits a unique fixed point

which is the unique weighed Stepanov-like pseudo-almost automorphic mild solution to (1). □

Taking

in (1), the above theorem gives the following corollary.

Corollary 3.1

Let \(\rho\in U_{\infty}\),

with

and there exist constants \(L_{F}\), \(L_{G}\) such that

Then (1) admits a unique weighted Stepanov-like pseudo-almost automorphic mild solution whenever

Remark 3.1

It is interesting to note that the function

is increasing from 0 to \(\frac{2}{\rho\pi}\) in the interval \(1<\alpha<2\). Therefore, with respect to the Lipschitz condition (15), the class of admissible semilinear terms \(F(t, x(t))\) is the best in the case \(\alpha=2\) and the worst in the case \(\alpha=1\). Note the direct relation with the term

in (11), where the singularity becomes better (smooth) when α goes from 1 to 2.

In this section we give an example to illustrate the above results.

Consider the following fractional relaxation-oscillation equation:

where \(\mu>0\), \(F: \mathbb{R}\times\mathbb{R}\rightarrow \mathbb{R}\) is a given function.

Take \(X=L^{2}([0,\pi])\) and define the operator A by

where

It is well known that

is the generator of an analytic semigroup on \(L^{2}[0,\pi]\). Hence,

is sectorial of type

Equation (17) can be formulated by the inhomogeneous problem (1), where

Example 4.1

Let us consider the nonlinearity

for all \(x\in X\) and \(s\in[0, \pi]\), \(t\in\mathbb{R}\). Thus one has

and

In consequence, from Theorem 3.2, it follows that the fractional differential equation (17) has a unique weighed Stepanov-like pseudo-almost automorphic mild solution.

Example 4.2

Let us consider the nonlinearity

for all \(x\in X\) and \(s\in[0, \pi]\), \(t\in\mathbb{R}\). Thus one has

and

In consequence, from Theorem 3.3, it follows that the fractional differential equation (17) has a unique weighed Stepanov-like pseudo-almost automorphic mild solution.

Example 4.3

Let us consider the nonlinearity

for all \(x\in X\) and \(s\in[0, \pi]\), \(t\in\mathbb{R}\). Thus one has

and

In consequence, from Theorem 3.4 it follows that the fractional differential equation (17) has a unique weighed Stepanov-like pseudo-almost automorphic mild solution whenever

This work is supported by the National Natural Science Foundation of China (No. 11301090), Appropriative Researching Fund for Professors and Doctors, Guangdong University of Education (No. 2013ARF02).

Authors and Affiliations

1. Department of Mathematics, Guangdong University of Education, Xingangzhong Road, Guangzhou, 510310, P.R. China

   Bing He, Junfei Cao & Bicheng Yang

Corresponding author

Correspondence to Junfei Cao.

Competing interests

The authors declare that they have no competing interests.

Authors’ contributions

All authors contributed equally to the writing of this paper. All authors read and approved the final version of the manuscript.

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