\documentclass[reqno]{amsart} \usepackage{hyperref} \AtBeginDocument{{\noindent\small \emph{Electronic Journal of Differential Equations}, Vol. 2014 (2014), No. 18, pp. 1--9.\newline ISSN: 1072-6691. URL: http://ejde.math.txstate.edu or http://ejde.math.unt.edu \newline ftp ejde.math.txstate.edu} \thanks{\copyright 2014 Texas State University - San Marcos.} \vspace{9mm}} \begin{document} \title[\hfilneg EJDE-2014/18\hfil Existence and uniqueness of strong solutions] {Existence and uniqueness of strong solutions for nonlocal evolution equations} \author[P. Chen, Y. Li \hfil EJDE-2014/18\hfilneg] {Pengyu Chen, Yongxiang Li} % in alphabetical order \address{Pengyu Chen \newline Department of Mathematics, Northwest Normal University, Lanzhou 730000, China} \email{chpengyu123@163.com} \address{Yongxiang Li \newline Department of Mathematics, Northwest Normal University, Lanzhou 730000, China} \email{liyx@nwnu.edu.cn} \thanks{Submitted April 28, 2013. Published January 10, 2014.} \subjclass[2000]{34G20, 34K30, 35D35, 47D06} \keywords{Evolution equation; nonlocal initial condition; strong solution; \hfill\break\indent analytic semigroups; existence and uniqueness} \begin{abstract} The aim of this article is to study the existence and uniqueness of strong solutions for a class of semilinear evolution equations with nonlocal initial conditions. The discussions are based on analytic semigroup theory and fixed point theorems. An example illustrates the main results. \end{abstract} \maketitle \numberwithin{equation}{section} \newtheorem{theorem}{Theorem}[section] \newtheorem{lemma}[theorem]{Lemma} \allowdisplaybreaks \section{Introduction} The nonlocal Cauchy problem for abstract evolution equation was first investigated by Byszewski and Lakshmikantham \cite{b4}, where, by using the Banach fixed point theorem, the authors obtained the existence and uniqueness of mild solutions for nonlocal differential equations. The nonlocal problem was motivated by physical problems. Indeed, it is demonstrated that the nonlocal problems have better effects in applications than the classical Cauchy problems. For example, it is used to represent mathematical models for evolution of various phenomena, such as nonlocal neural networks, nonlocal pharmacokinetics, nonlocal pollution and nonlocal combustion (see McKibben \cite{m1}). For this reason, differential or integro-differential equations with nonlocal initial conditions were studied by many authors and some basic results on nonlocal problems have been obtained, see the references in this article and their references. Particularly, in 1999, Byszewski \cite{b7} obtained the existence and uniqueness of classical solution to a class of abstract functional differential equations with nonlocal conditions of the form \begin{gather} u'(t)= f(t,u(t),u(a(t))),\quad t\in I,\label{e1.1}\\ u(t_0)+\sum_{k=1}^{p}c_ku(t_k)=x_0, \label{e1.2} \end{gather} where $I:=[t_0,t_0+T]$, $t_00$; $f:I\times E^2\to E$ and $a:I\to I$ are given functions satisfying some assumptions; $E$ is a Banach space, $x_0\in E$, $c_k\neq 0$ $(k=1,2,\dots,p)$ and $p\in \mathbb{N}$. The author pointed out that if $c_k\neq 0$, $k=1,2,\dots,p$, then the results of the paper can be applied to kinematics to determine the location evolution $t\to u(t)$ of a physical object for which we do not know the positions $u(0),u(t_1),\dots,u(t_p)$, but we know that the nonlocal condition \eqref{e1.2} holds. The nonlocal condition of type \eqref{e1.2} has also been used by Deng \cite{d2} to describe the diffusion phenomenon of a small amount of gas in a transparent tube. In this case, condition \eqref{e1.2} allows the additional measurements at $t_k$, $k=1,2,\dots,p$, which is more precise than the measurement just at $t=t_0$. Consequently, to describe some physical phenomena, the nonlocal condition can be more useful than the standard initial condition. Recently, Vrabie \cite{v1} studied the existence of global $C^0$-solutions for a class of nonlinear functional differential evolution inclusions of the form \begin{equation} \begin{gathered} u'(t)\in Au(t)+f(t),\quad t\geq 0, \\ f(t)\in F(t,u(t),u_t),\quad t\geq 0,\\ u(t)=g(u)(t),\quad t\in[-\tau,0], \end{gathered} \label{e1.3} \end{equation} where $X$ is a real Banach space, $A$ is the infinitesimal generator of a nonlinear compact semigroup, $\tau\geq 0$, $F:[0,+\infty)\times X\times C([-\tau,+\infty);\overline{D(A)})\to X$ is a nonempty convex and weakly compact value multi-function and $g:C_b([-\tau,+\infty);\overline{D(A)})\to C([-\tau,0);\overline{D(A)})$. In \cite{z1}, by using the approach of geometry of Banach space, Hausdroff metric, the measure of noncompactness and fixed point theorem, Zhu, Huang and Li studied the existence of integral solutions for the following nonlinear set-valued differential inclusion with nonlocal initial conditions \begin{equation} \begin{gathered} u'(t)\in Au(t)+F(t,u(t)),\quad 00$ is a constant, $f: J\times H\to H$ is a given function satisfying some assumptions, $00$. From \cite{d1,h1,p1}, we know that $-A$ generates an analytic operator semigroup $T(t)(t\geq0)$ on $H$, which is exponentially stable and satisfies \begin{equation} \| T(t)\|\leq e^{-\lambda_1t},\quad \forall t\geq0.\label{e2.2} \end{equation} Since the positive definite self-adjoint operator $A$ has compact resolvent, the embedding $D(A)\hookrightarrow H$ is compact, and therefore $T(t)(t\geq0)$ is also a compact semigroup. We recall some concepts and conclusions on the fractional powers of $A$. For $\alpha>0$, $A^{-\alpha}$ is defined by \begin{equation} A^{-\alpha}=\frac{1}{\Gamma(\alpha)}\int_0^{\infty} s^{\alpha-1}T(s)ds,\label{e2.3} \end{equation} where $\Gamma(\cdot)$ is the Euler gamma function. $A^{-\alpha}\in \mathcal {L}(H)$ is injective, and $A^\alpha$ can be defined by $A^\alpha=(A^{-\alpha})^{-1}$ with the domain $D(A^\alpha)=A^{-\alpha}(H)$. For $\alpha=0$, let $A^\alpha=I$. We endow an inner product $(\cdot,\cdot)_\alpha=(A^\alpha\cdot,A^\alpha\cdot)$ to $D(A^\alpha)$. Since $A^\alpha$ is a closed linear operator, it follows that $(D(A^\alpha),(\cdot,\cdot)_\alpha)$ is a Hilbert space. We denote by $H_\alpha$ the Hilbert space $(D(A^\alpha),(\cdot,\cdot)_\alpha)$. Especially, $H_0=H$ and $H_1=D(A)$. For $0\leq\alpha<\beta$, $H_\beta$ is densely embedded into $H_\alpha$ and the embedding $H_\beta\hookrightarrow H_\alpha$ is compact. For the details of the properties of the fractional powers, we refer to \cite{h1,x1}. It is well known \cite[Chapter 4, Theorem 2.9]{p1} that for any $u_0\in D(A)$ and $h\in C^1(J,H)$, the initial value problem of linear evolution equation (LIVP) \begin{equation} \begin{gathered} u'(t)+Au(t)= h(t),\quad t\in J, \\ u(0)=u_0, \end{gathered} \label{e2.4} \end{equation} has a unique classical solution $u\in C^1(J,H)\cap C(J,D(A))$ expressed by \begin{equation} u(t)=T(t)u_0+\int_0^{t}T(t-s)h(s)ds.\label{e2.5} \end{equation} If $u_0\in H$ and $h\in L^1(J,H)$, the function $u$ given by \eqref{e2.5} belongs to $C(J,H)$, which is known as a mild solution of \eqref{e2.4}. If a mild solution $u$ of \eqref{e2.4} belongs to $W^{1,1}(J,H)\cap L^1(J,D(A))$ and satisfies the equation for a.e. $t\in J$, we call it a strong solution. Throughout this paper, we assume that \begin{itemize} \item[(P0)] $\sum_{k=1}^{p}|c_k|0$, let $$ \Omega_r=\{u\in C(J,H): \| u\|_{C}\leq r\}, $$ then $\Omega_r$ is a closed ball in $C(J,H)$ with center $\theta$ and radius $r$. \section{Main results} \begin{theorem} \label{thm3.1} Let $A$ be a positive definite self-adjoint operator in Hilbert space $H$, and having compact resolvent. Let $f:J\times H\to H$ be continuous. If conditions {\rm (P0)} and \begin{itemize} \item[(P1)] There exist positive constants $\eta$ and $M$ with $$ \eta<\frac{\lambda_1(1-e^{-\lambda_1t_1} \sum_{k=1}^{p}| c_k|)}{\sum_{k=1}^{p}| c_k|+1} $$ such that $$ \| f(t,u)\|\leq \eta \| u\|+M,\quad t\in J,\;u\in H\,, $$ \end{itemize} are satisfied then \eqref{e1.5}--\eqref{e1.6} has at least one strong solution $u\in W^{1,2}(J,H)\cap L^2(J,D(A))$. \end{theorem} \begin{proof} We consider the operator $\mathcal {F}$ on $C(J,H)$ defined by \begin{equation} \mathcal {F}u(t)=\sum _{k=1}^{p}c_kT(t)B\int_0^{t_k} T(t_k-s)f(s,u(s))ds+\int_0^{t}T(t-s)f(s,u(s))ds, \label{e3.1} \end{equation} $t\in J$. By condition (P0) and Lemma \ref{lem2.1}, it is easy to see that the mild solution of problem \eqref{e1.5}-\eqref{e1.6} is equivalent to the fixed point of the operator $\mathcal {F}$. In the following, we will prove that $\mathcal {F}$ has a fixed point by using the Schauder fixed point theorem. At first, we can prove that $\mathcal {F}:C(J,H)\to C(J,H)$ is continuous by condition (P1) and the usual techniques (see, e.g. \cite{f1,x3}). Subsequently, we prove that $\mathcal {F}:C(J,H)\to C(J,H)$ is a compact operator. Let $0\leq\alpha<\frac{1}{2}$, $0<\nu<\frac{1}{2}-\alpha$. By \cite{a1}, we can prove that the operator $\mathcal {F}$ defined by \eqref{e3.1} maps $C(J,H)$ into $C^\nu(J,H_\alpha)$. By Arzela-Ascoli's theorem, the embedding $C^\nu(J,H_\alpha)\hookrightarrow C(J,H)$ is compact. This implies that $\mathcal {F}: C(J,H)\to C(J,H)$ is a compact operator. Combining this with the continuity of $\mathcal {F}$ on $C(J,H)$, we know that $\mathcal {F}: C(J,H)\to C(J,H)$ is a completely continuous operator. Next, we prove that there exists a positive constant $R$ big enough, such that $Q(\Omega_{R})\subset\Omega_{R}$. For any $u\in C(J,H)$, by the condition (P1), we have \begin{equation} \| f(t,u(t))\| \leq \eta\| u(t)\| +M\leq \eta\| u\|_{C} +M,\quad t\in J.\label{e3.2} \end{equation} Choose \begin{equation} R\geq\frac{M(1+\sum_{k=1}^{p}| c_k|)}{\lambda_1(1-e^{-\lambda_1t_1} \sum_{k=1}^{p}| c_k|)-\eta(1+\sum_{k=1}^{p}| c_k|)}.\label{e3.3} \end{equation} For any $u\in \Omega_{R}$ and $t\in J$, we have \begin{align*} \| \mathcal {F}u(t)\| &\leq \sum_{k=1}^{p}| c_k| e^{-\lambda_1t}\|B\|\int_0^{t_k} e^{-\lambda_1(t_k-s)}\| f(s,u(s))\| ds\\ &\quad +\int_0^{t} e^{-\lambda_1(t-s)}\| f(s,u(s))\| ds\\ &\leq \frac{\sum_{k=1}^{p}| c_k| e^{-\lambda_1t}}{1-e^{-\lambda_1t_1} \sum_{k=1}^{p}| c_k|}\int_0^{t_k}e^{-\lambda_1(t_k-s)} \big(\eta\| u\|_{C}+M\big)ds\\ &\quad +\int_0^{t}e^{-\lambda_1(t-s)} \big(\eta\| u\|_{C}+M\big)ds\\ &\leq \frac{\sum_{k=1}^{p}| c_k|+1}{\lambda_1(1-e^{-\lambda_1t_1} \sum_{k=1}^{p}| c_k|)}\big(\eta R+M\big) \leq R. \end{align*} Thus, $\| \mathcal {F}u\|_{C}\leq R$. Therefore, $\mathcal {F}(\Omega_{R})\subset\Omega_{R}$. By Schauder fixed point theorem, we know that $\mathcal {F}$ has at least one fixed point $u\in\Omega_{R}$. Since $u$ is mild solution of \eqref{e2.9}--\eqref{e2.10} for $h(\cdot)=f(\cdot,u(\cdot))$, by Lemma \ref{lem2.1}, $u\in W^{1,2}(J,H)\cap L^2(J,D(A))$ is a strong solution of the problem \eqref{e1.5}--\eqref{e1.6}. This completes the proof. \end{proof} \begin{theorem} \label{thm3.2} Let $A$ be a positive definite self-adjoint operator in Hilbert space $H$ and it have compact resolvent, $f$: $J\times H\to H$ be continuous. If the condition (P0) and the condition \begin{itemize} \item[(P2)] There exists a positive constant $$ \eta<\frac{\lambda_1(1-e^{-\lambda_1t_1} \sum_{k=1}^{p}| c_k|)}{\sum_{k=1}^{p}| c_k|+1} $$ such that $$ \| f(t,u)-f(t,v)\|\leq \eta \|u-v\|,\quad \forall u,v\in H, $$ \end{itemize} holds then \eqref{e1.5}--\eqref{e1.6} has a unique strong solution $\widehat{u}\in W^{1,2}(J,H)\cap L^2(J,D(A))$. \end{theorem} \begin{proof} By the proof of Theorem \ref{thm3.1}, we know that the operator $\mathcal {F}:C(J,H)\to C(J,H)$ is completely continuous and the mild solution of problem \eqref{e1.5}--\eqref{e1.6} is equivalent to the fixed point of $\mathcal {F}$. For any $u,v\in C(J,H)$, from the assumption (P2) and \eqref{e3.1}, we have \begin{equation} \begin{aligned} \| \mathcal {F}u(t)-\mathcal{F}v(t)\| &\leq \sum_{k=1}^{p}| c_k| e^{-\lambda_1t}\| B\|\int_0^{t_k} e^{-\lambda_1(t_k-s)}\| f(s,u(s))-f(s,v(s))\| ds\\ &\quad +\int_0^{t} e^{-\lambda_1(t-s)}\| f(s,u(s))-f(s,v(s))\| ds\\ &\leq \frac{\sum_{k=1}^{p}| c_k| e^{-\lambda_1t}}{1-e^{-\lambda_1t_1} \sum_{k=1}^{p}| c_k|}\int_0^{t_k}e^{-\lambda_1(t_k-s)} \eta\| u-v\|_{C}ds\\ &\quad +\int_0^{t}e^{-\lambda_1(t-s)} \eta\| u-v\|_{C}ds\\ &\leq \frac{\eta(\sum_{k=1}^{p}| c_k|+1)}{\lambda_1(1-e^{-\lambda_1t_1} \sum_{k=1}^{p}| c_k|)}\| u-v\|_{C}. \end{aligned}\label{e3.5} \end{equation} Therefore, we have \begin{equation} \| \mathcal {F}u-\mathcal {F}v\|_{C} \leq\frac{\eta(\sum_{k=1}^{p}| c_k|+1)}{\lambda_1(1-e^{-\lambda_1t_1} \sum_{k=1}^{p}| c_k|)}\| u-v\|_{C}.\label{e3.6} \end{equation} Thus, by the assumption (P2) and \eqref{e3.6}, we know that $\mathcal{F}$ is a contraction operator on $C(J,H)$, and therefore $\mathcal{F}$ has a unique fixed point $\widehat{u}$ on $C(J,H)$. Since $\widehat{u}$ is mild solution of \eqref{e2.9}--\eqref{e2.10} for $h(\cdot)=f(\cdot,\widehat{u}(\cdot))$, by Lemma \ref{lem2.1}, $\widehat{u}\in W^{1,2}(J,H)\cap L^2(J,D(A))$ is a unique strong solution of \eqref{e1.5}--\eqref{e1.6}. This completes the proof of Theorem \ref{thm3.2}. \end{proof} \section{Application} To illustrate our results, we consider the following semilinear heat equation with nonlocal condition \begin{equation} \begin{gathered} \frac{\partial}{\partial t}w(x,t)-\kappa\frac{\partial^2}{\partial x^2}w(x,t) =g(x,t,w(x,t)),\quad (x,t)\in[a,b]\times J, \\ w(a,t)=w(b,t)=0,\quad t\in J,\\ w(x,0)=\sum_{k=1}^{p}\arctan\frac{1}{2k^2}w(x,k),\quad x\in[a,b], \end{gathered} \label{e4.1} \end{equation} where $\kappa>0$ is the coefficient of heat conductivity, $J=[0,K]$, $g:[a,b]\times J\times\mathbb{R}\to \mathbb{R}$ is continuous. Let $H=L^2(a,b)$ with the norm $\|\cdot\|_2$. Define an operator $A$ in Hilbert space $H$ by \begin{equation} D(A)=H^2(a,b)\cap H_0^1(a,b),\quad Au=-\kappa\frac{\partial^2}{\partial x^2}u,\label{e4.2} \end{equation} where $H^2(a,b)=W^{2,2}(a,b)$, $H_0^1(a,b)=W_0^{1,2}(a,b)$. From \cite{h1,p1}, we know that $A$ is a positive definite self-adjoint operator on $H$ and $-A$ is the infinitesimal generator of an analytic, compact semigroup $T(t)(t\geq0)$. Moreover, $A$ has discrete spectrum with eigenvalues $\lambda_n={\kappa n^2\pi^2}/{(b-a)^2}$, $n\in \mathbb{N}$, associated normalized eigenvectors $v_n(x)=\sqrt{2/z}\sin {n\pi x}/{(b-a)}$, $z=\sqrt{b-a+(\sin2n\pi a-\sin2n\pi b)/(2n\pi)}$, the set $\{v_n: n\in \mathbb{N}\}$ is an orthonormal basis of $H$ and \begin{equation} T(t)u=\sum_{n=1}^{\infty}e^{-\frac{\kappa n^2\pi^2t}{(b-a)^2}}(u,v_n)v_n,\quad \| T(t)\|\leq e^{-\frac{\kappa\pi^2t}{(b-a)^2}}, \quad \forall t\geq0.\label{e4.3} \end{equation} Let $u(t)=w(\cdot,t)$, $f(t,u(t))=g(\cdot,t,w(\cdot,t))$, $c_k=\arctan\frac{1}{2k^2}$, $t_k=k$, $k=1,2,\dots,p$, then \eqref{e4.1} can be rewritten into the abstract form of problem \eqref{e1.5}--\eqref{e1.6}. \begin{theorem} \label{thm4.1} Assume that the nonlinear term $g$ satisfies the following conditions: \begin{itemize} \item[(G1)] there exist positive constants $\eta$ and $M$ with $\eta<\frac{\kappa\pi^2}{(b-a)^2(\pi+4)} \big(4-\pi e^{-\frac{\kappa\pi^2}{(b-a)^2}}\big)$ such that $$ | g(x,t,w)|\leq \eta | w|+M,\quad x\in [a,b],\;t\in J,\;w\in \mathbb{R}; $$ \item[(G2)] there exists a function $c:\mathbb{R}^+\to\mathbb{R}^+$ such that $$ | g(x,t,\xi)-g(y,s,\eta)|\leq c(\rho)\big(| x-y|^\mu +|t-s|^{\mu/2}+| \xi-\eta|\big), $$ for any $\rho>0$, $\mu\in(0,1)$ and $(x,t,\xi)$, $(y,s,\eta)\in[a,b]\times J\times[-\rho,\rho]$. \end{itemize} Then \eqref{e4.1} has at least one classical solution $u\in C^{2+\mu,1+\mu/2}([a,b]\times J)$. \end{theorem} \begin{proof} Since $$ \sum_{k=1}^{p}|c_k|\leq\sum_{k=1}^{\infty}\arctan\frac{1}{2k^2} =\pi/4