1、Differential Calculus/ D/ x* p2 R6 r$ $Newton and Leibniz,quite independently of one another,were largely responsible for developing the ideas of integral calculus to the point where hitherto insurmountable problems could be solved by more or less routine methods.The successful accomplishments of th

2、ese men were primarily due to the fact that they were able to fuse together the integral calculus with the second main branch of calculus,differential calculus.In this article, we give sucient conditions for controllability of some partial neutral functional dierential equations with innite delay. W

3、e suppose that the linear part is not necessarily densely dened but satises the resolvent estimates of the Hille-Yosida theorem. The results are obtained using the integrated semigroups theory. An application is given to illustrate our abstract result.Key words Controllability; integrated semigroup;

4、 integral solution; innity delay1 IntroductionIn this article, we establish a result about controllability to the following class of partial neutral functional dierential equations with innite delay: (1)where the state variabletakes values in a Banach spaceand the control is given in ,the Banach spa

5、ce of admissible control functions with U a Banach space. C is a bounded linear operator from U into E, A : D(A) E E is a linear operator on E, B is the phase space of functions mapping (, 0 into E, which will be specied later, D is a bounded linear operator from B into E dened byis a bounded linear

6、 operator from B into E and for each x : (, T E, T 0, and t 0, T , xt represents, as usual, the mapping from (, 0 into E dened byF is an E-valued nonlinear continuous mapping on.The problem of controllability of linear and nonlinear systems represented by ODE in nit dimensional space was extensively

7、 studied. Many authors extended the controllability concept to innite dimensional systems in Banach space with unbounded operators. Up to now, there are a lot of works on this topic, see, for example, 4, 7, 10, 21. There are many systems that can be written as abstract neutral evolution equations wi

8、th innite delay to study 23. In recent years, the theory of neutral functional dierential equations with innite delay in innite dimension was developed and it is still a eld of research (see, for instance, 2, 9, 14, 15 and the references therein). Meanwhile, the controllability problem of such syste

9、ms was also discussed by many mathematicians, see, for example, 5, 8. The objective of this article is to discuss the controllability for Eq. (1), where the linear part is supposed to be non-densely dened but satises the resolvent estimates of the Hille-Yosida theorem. We shall assume conditions tha

10、t assure global existence and give the sucient conditions for controllability of some partial neutral functional dierential equations with innite delay. The results are obtained using the integrated semigroups theory and Banach xed point theorem. Besides, we make use of the notion of integral soluti

11、on and we do not use the analytic semigroups theory.Treating equations with innite delay such as Eq. (1), we need to introduce the phase space B. To avoid repetitions and understand the interesting properties of the phase space, suppose that is a (semi)normed abstract linear space of functions mappi

12、ng (, 0 into E, and satises the following fundamental axioms that were rst introduced in 13 and widely discussed in 16.(A) There exist a positive constant H and functions K(.), M(.):,with K continuous and M locally bounded, such that, for any and ,if x : (, + a E, and is continuous on , +a, then, fo

13、r every t in , +a, the following conditions hold:(i) ,(ii) ,which is equivalent to or every(iii) (A) For the function in (A), t xt is a B-valued continuous function for t in , + a.(B) The space B is complete. Throughout this article, we also assume that the operator A satises the Hille-Yosida condit

14、ion :(H1) There exist and ，such that and （2）Let A0 be the part of operator A in dened byIt is well known that and the operator generates a strongly continuous semigroup on .Recall that 19 for all and ,one has and .We also recall that coincides on with the derivative of the locally Lipschitz integrat

15、ed semigroup generated by A on E, which is, according to 3, 17, 18, a family of bounded linear operators on E, that satises(i) S(0) = 0,(ii) for any y E, t S(t)y is strongly continuous with values in E,(iii) for all t, s 0, and for any 0 there exists a constant l() 0, such that or all t, s 0, .The C

16、0-semigroup is exponentially bounded, that is, there exist two constants and ,such that for all t 0. Notice that the controllability of a class of non-densely dened functional dierential equations was studied in 12 in the nite delay case.、2 Main Results We start with introducing the following deniti

17、on.Denition 1 Let T 0 and B. We consider the following denition.We say that a function x := x(., ) : (, T ) E, 0 0, such that for 1, 2 B and t 0. (4)Using Theorem 7 in 1, we obtain the following result.Theorem 1 Assume that (H1), (H2), and (H3) hold. Let B such that D D(A). Then, there exists a uniq

18、ue integral solution x(., ) of Eq. (1), dened on (,+) .Denition 2 Under the above conditions, Eq. (1) is said to be controllable on the interval J = 0, , 0, if for every initial function B with D D(A) and for any e1 D(A), there exists a control u L2(J,U), such that the solution x(.) of Eq. (1) satis

19、es .Theorem 2 Suppose that(H1), (H2), and (H3) hold. Let x(.) be the integral solution of Eq. (1) on (, ) , 0, and assume that (see 20) the linear operator W from U into D(A) dened by ， （5）nduces an invertible operator on ，such that there exist positive constants and satisfying and ，then, Eq. (1) is

20、 controllable on J provided that ， （6）Where .Proof Following 1, when the integral solution x(.) of Eq. (1) exists on (, ) , 0, it is given for all t 0, by Or Then, an arbitrary integral solution x(.) of Eq. (1) on (, ) , 0, satises x() = e1 if and only ifThis implies that, by use of (5), it suces to

21、 take, for all t J, in order to have x() = e1. Hence, we must take the control as above, and consequently, the proof is reduced to the existence of the integral solution given for all t 0, byWithout loss of generality, suppose that 0. Using similar arguments as in 1, we can see hat, for every ,and t

22、 0, ,As K is continuous and ,we can choose 0 small enough, such that.Then, P is a strict contraction in ,and the xed point of P gives the unique integral olution x(., ) on (, that veries x() = e1.Remark 1 Suppose that all linear operators W from U into D(A) dened by 0 a 0, induce invertible operator

23、s on ,such that there exist positive constants N1 and N2 satisfying and ,taking ,N large enough and following 1. A similar argument as the above proof can be used inductively in ,to see that Eq. (1) is controllable on 0, T for all T 0.Acknowledgements The authors would like to thank Prof. Khalil Ezz

24、inbi and Prof. Pierre Magal for the fruitful discussions.References 1 Adimy M, Bouzahir H, Ezzinbi K. Existence and stability for some partial neutral functional dierential equations with innite delay. J Math Anal Appl, 2004, 294: 4384612 Adimy M, Ezzinbi K. A class of linear partial neutral functio

25、nal dierential equations with nondense domain. J Dif Eq, 1998, 147: 2853323 Arendt W. Resolvent positive operators and integrated semigroups. Proc London Math Soc, 1987, 54(3):3213494 Atmania R, Mazouzi S. Controllability of semilinear integrodierential equations with nonlocal conditions. Electronic

26、 J of Di Eq, 2005, 2005: 195 Balachandran K, Anandhi E R. Controllability of neutral integrodierential innite delay systems in Banach spaces. Taiwanese J Math, 2004, 8: 6897026 Balasubramaniam P, Ntouyas S K. Controllability for neutral stochastic functional dierential inclusionswith innite delay in

27、 abstract space. J Math Anal Appl, 2006, 324(1): 161176、7 Balachandran K, Balasubramaniam P, Dauer J P. Local null controllability of nonlinear functional dier-ential systems in Banach space. J Optim Theory Appl, 1996, 88: 61758 Balasubramaniam P, Loganathan C. Controllability of functional dierenti

28、al equations with unboundeddelay in Banach space. J Indian Math Soc, 2001, 68: 1912039 Bouzahir H. On neutral functional dierential equations. Fixed Point Theory, 2005, 5: 1121The study of differential equations is one part of mathematics that, perhaps more than any other, has been directly inspired

29、 by mechanics, astronomy, and mathematical physics. Its history began in the 17th century when Newton, Leibniz, and the Bernoullis solved some simple differential equation arising from problems in geometry and mechanics. There early discoveries, beginning about 1690, gradually led to the development

30、 of a lot of “special tricks” for solving certain special kinds of differential equations. Although these special tricks are applicable in mechanics and geometry, so their study is of practical importance.微分方程牛頓和萊布尼茨，完全相互獨立，主要負(fù)責(zé)開發(fā)積分學(xué)思想的地步，迄今無法解決的問題可以解決更多或更少的常規(guī)方法。這些成功的人主要是由于他們能夠?qū)⒎e分學(xué)和微分融合在一起的事實。中心思想是微

31、分學(xué)的概念衍生。 在這篇文章中，我們建立一個關(guān)于可控的結(jié)果偏中性與無限時滯泛函微分方程的下面的類： (1)狀態(tài)變量在空間值和控制用受理控制范圍的Banach空間，Banach空間。 C是一個有界的線性算子從U到E，A：A : D(A) E E上的線性算子，B是函數(shù)的映射相空間（ - ，0在E，將在后面D是有界的線性算子從B到E為是從B到E的線性算子有界，每個x : (, T E, T 0,，和t0，T，xt表示為像往常一樣，從（映射 - ，0到由E定義為F是一個E值非線性連續(xù)映射在。ODE的代表在三維空間中的線性和非線性系統(tǒng)的可控性問題進(jìn)行了廣泛的研究。許多作者延長無限維系統(tǒng)的可控性概念，在B

32、anach空間無限算子。到現(xiàn)在，也有很多關(guān)于這一主題的作品，看到的，例如，4，7，10，21。有許多方程可以無限延遲的研究23為抽象的中性演化方程的書面。近年來，中立與無限時滯泛函微分方程理論在無限維度仍然是一個研究領(lǐng)域（見，例如，2，9，14，15和其中的參考文獻(xiàn)）。同時，這種系統(tǒng)的可控性問題也受到許多數(shù)學(xué)家討論可以看到的，例如，5,8。本文的目的是討論方程的可控性。 （1），其中線性部分是應(yīng)該被非密集的定義，但滿足的Hille- Yosida定理解估計。我們應(yīng)當(dāng)保證全局存在的條件，并給一些偏中性無限時滯泛函微分方程的可控性的充分條件。結(jié)果獲得的積分半群理論和Banach不動點定理。此外，我

33、們使用的整體解決方案的概念和我們不使用半群的理論分析。方程式，如無限時滯方程。 （1），我們需要引入相空間B.為了避免重復(fù)和了解的相空間的有趣的性質(zhì)，假設(shè)是（半）賦范抽象線性空間函數(shù)的映射（ - ，0到E滿足首次在13介紹了以下的基本公理和廣泛16進(jìn)行了討論。（一） 存在一個正的常數(shù)H和功能K，M：連續(xù)與K和M，局部有界，例如，對于任何，如果x : (, + a E,，和是在 ，+ A 連續(xù)的，那么，每一個在T，+ A，下列條件成立： (i) ,(ii) ,等同與 或者對伊(iii) （a）對于函數(shù)在A中，t xt是B值連續(xù)函數(shù)在, + a.（b）空間B是封閉的整篇文章中，我們還假定算子A滿足的Hille- Yosida條件：(1) 在和，和 （2）設(shè)A0是算子的部分一個由定義為這是眾所周知的，和算子對于具有連續(xù)半群?；叵胍幌?，19所有和。.我們還知道在，這是一個關(guān)于電子所產(chǎn)生的局部Lipschitz積分半群的衍生，按3，17，18，一個有界線性算子的E系列，滿足(iv) S(0) = 0,(v) for any y E, t S(t)y判斷為E,(vi) for all t,