---

Discontinuity, Nonlinearity, and Complexity 13(2) (2024) 333--349 | DOI:10.5890/DNC.2024.06.011

R. P. Agarwal$^{1}$, H. Leiva$^{2}$, L. Riera$^{2}$, S. Lalvay$^{2}$

$^{1}$ Department of Mathematics, Texas A&M University-Kingsville, 700 University Blvd., MSC 172, Kingsville, Texas 78363-8202

$^{2}$ Department of Mathematics, School of Mathematical and Computational Sciences, Yachay Tech, San Miguel de Urcuqui-100119, Ecuador

Download Full Text PDF

 

Abstract

Fractional Power Spaces and Karakostas' Fixed Point Theorem were used to prove the existence and uniqueness of solutions for a semilinear neutral evolution equation with impulses and nonlocal conditions in a Banach space. As an application of our main result, we consider a neutral type Burgers' equation.

References

1. [1]	Bainov, D.D. and Simeonov, P.S. (1989), Systems with Impulse Effect: Stability, Theory, and Applications, Chichester, Ellis Horwood Limited/John Wiley $\&$ Sons.

2. [2]	Benchohra, M., Henderson, J., and Ntouyas, S. (2006), Impulsive Differential Equations and Inclusions, Contemporary Mathematics and Its Applications, Hindawi Publishing Corporation.

3. [3]	Lakshmikantham, V., Bainov, D.D., and Simeonov, P.S. (1989), Theory of Impulsive Differential Equations, Series in Modern Applied Mathematics, World Scientific. Singapore.

4. [4]	Li, X., Bohner, M., and Wang, C.-K. (2015), Impulsive differential equations: periodic solutions and applications, Automatica, 52, 173-178.

5. [5]	Liu, X. (1994), Stability results for impulsive differential systems with applications to population growth models, Dynamics and Stability of Systems, 9(2), 163-174.

6. [6]	Samoilenko, A.M. and Perestyuk, N. (1995), Impulsive Differential Equations, World Scientific, Singapore.

7. [7]	Hale, J. (1994), Partial neutral functional differential equations, Revue Roumaine de Math{ematiques Pures et Appliqu{e}es}, 39(4), 339-344.

8. [8]	Wu, J. (1996), Theory and Applications of Partial Functional Differential Equations, Springer Science \& Business Media

9. [9]	Gurtin, M. and Pipkin, A. (1968), A general theory of heat conduction with finite wave speeds, Archive for Rational Mechanics and Analysis, 31(2), 113-126.

10. [10]	Nunziato, J. (1971), On heat conduction in materials with memory, Quarterly of Applied Mathematics, 29(2), 187-204.

11. [11]	Balachandran, K. and Anandhi, E.R. (2004), Controllability of neutral functional integrodifferential infinite delay systems in Banach spaces, Taiwanese Journal of Mathematics, 8(4), 689-702.

12. [12]	Chalishajar, D.N. (2011), Controllability of impulsive partial neutral functional differential equation with infinite delay, International Journal of Mathematical Analysis, 5(8), 369-380.

13. [13]	Chang, J.-C. and Liu, H. (2009), Existence of solutions for a class of neutral partial differential equations with nonlocal conditions in the $\alpha$-norm, Nonlinear Analysis: Theory, Methods \& Applications, 71(9), 3759-3768.

14. [14]	Cuevas, C., Hern{a}ndez, E., and Rabelo, M. (2009), The existence of solutions for impulsive neutral functional differential equations, Computers \& Mathematics with Applications, 58(4), 744-757.

15. [15]	Hern{a}ndez, E. (2011), Global solutions for abstract impulsive neutral differential equations, Mathematical and Computer Modelling, 53(1-2), 196-204.

16. [16]	Radhakrishnan, B., Mohanraj, A., and Vinoba, V. (2013), Existence of solutions for nonlinear impulsive neutral integro-differential equations of Sobolev type with nonlocal conditions in Banach spaces, Electronic Journal of Differential Equations, 2013(18), 1-13.

17. [17]	Byszewski, L. and Lakshmikantham, V. (1991), Theorem about the existence and uniqueness of a solution of a nonlocal abstract Cauchy problem in a Banach space, Applicable Analysis, 40(1), 11-19.

18. [18]	Byszewski, L. (1991), Theorems about the existence and uniqueness of solutions of a semilinear evolution nonlocal Cauchy problem, Journal of Mathematical Analysis and Applications, 162(2), 494-505.

19. [19]	Byszewski, L. and Ak{\c{c}}a, H. (1997), On a mild solution of a semilinear functional-differential evolution nonlocal problem, Journal of Applied Mathematics and Stochastic Analysis, 10(3), 265-271.

20. [20]	Hern{a}ndez, E., DosSantos, J.S., and Azevedo, K.A. (2011), Existence of solutions for a class of abstract differential equations with nonlocal conditions, Nonlinear Analysis: Theory, Methods \& Applications, 74(7), 2624-2634.

21. [21]	Leiva, H. and Sivoli, Z. (2020), Smoothness of bounded solutions for semilinear evolution equations in Banach spaces and applications, Far East Journal of Applied Mathematics, 106(1-2), 1-24.

22. [22]	Lin, Y. and Liu, J.H. (1996), Semilinear integrodifferential equations with nonlocal Cauchy problem, Nonlinear Analysis, 26(5), 1023-1033.

23. [23]	Liu, H. and Chang, J.-C. (2009), Existence for a class of partial differential equations with nonlocal conditions, Nonlinear Analysis: Theory, Methods \& Applications, 70(9), 3076-3083.

24. [24]	Ntouyas, S. (2006), Nonlocal initial and boundary value problems: a survey, Handbook of Differential Equations: Ordinary Differential Equations, Elsevier, 461-557.

25. [25]	Ntouyas, S. and Tsamatos, P.C. (1997), Global existence for semilinear evolution integrodifferential equations with delay and nonlocal conditions, Applicable Analysis, 64(1-2), 99-105.

26. [26]	Shukla, A., Sukavanam, N., and Pandey, D.N. (2015), Approximate controllability of semilinear stochastic control system with nonlocal conditions, Nonlinear Dynamics and Systems Theory, 15(3), 321-333.

27. [27]	Anguraj, A. and Karthikeyan, K. (2009), Existence of solutions for impulsive neutral functional differential equations with nonlocal conditions, Nonlinear Analysis: Theory, Methods \& Applications, 7, 2717-2721.

28. [28]	Sadovskii, B.N. (1967), A fixed-point principle, Functional Analysis and Its Applications, 1(2), 151-153.

29. [29]	Tidke, H.L. (2009), Existence of global solutions to nonlinear mixed Volterra-Fredholm integrodifferential equations with nonlocal conditions, Electronic Journal of Differential Equations, 2009(55), 1-7.

30. [30]	Dineshkumar, C. and Udhayakumar, R. (2021), A Note on Existence of Global Solutions for Impulsive Functional Integrodifferential Systems, Discontinuity, Nonlinearity, and Complexity, 10(3), 397-407.

31. [31]	Hern{a}ndez, E. and Henr{i}quez, H.R. (1998), Existence results for partial neutral functional differential equations with unbounded delay, Journal of Mathematical Analysis and Applications, 221(2), 452-475.

32. [32]	Leiva, H. (2018), Karakostas fixed point theorem and the existence of solutions for impulsive semilinear evolution equations with delays and nonlocal conditions, Communications in Mathematical Analysis, 21(2), 68-91.

33. [33]	Pazy, A. (2012), Semigroups of Linear Operators and Applications to Partial Differential Equations, Springer Science \& Business Media.

34. [34]	Henry, D. (1981), Geometric Theory of Semilinear Parabolic Equations, Springer-Verlag. Berlin Heidelberg New York.

35. [35]	Goldstein, J.A. (1985), Semigroups of Linear Operators and Applications, Oxford University Press. New York.

36. [36]	Guo, D. and Liu, X. (1993), Extremal solutions of nonlinear impulsive integrodifferential equations in Banach spaces, Journal of Mathematical Analysis and Applications, 177(2), 538-552.

37. [37]	Liu, J.H. (1999), Nonlinear impulsive evolution equations, Dynamics of Continuous Discrete and Impulsive Systems, 6(1), 77-85.

38. [38]	Hern{a}ndez, E., Pierri, M., and Gon{\c{c}}alves, G. (2006), Existence results for an impulsive abstract partial differential equation with state-dependent delay, Computers \& Mathematics with Applications, 52(3-4), 411-420.

39. [39]	Karakostas, G.L. (2003), An extension of Krasnoselskii's fixed point theorem for contractions and compact mappings, Topological Methods in Nonlinear Analysis, 22(1), 181-191.

40. [40]	Balachandran, K., Sakthivel, R., and Dauer, J.P. (2000), Controllability of neutral functional integrodifferential systems in Banach spaces, Computers \& Mathematics with Applications, 39(1), 117-126.

41. [41]	Ladas, G.E. and Lakshmikantham, V. (1972) Differential Equations in Abstract Spaces, Academic Press. New York and London

42. [42]	Ezzinbi, K., Fu, X., and Hilal, K. (2007), Existence and regularity in the $\alpha-$norm for some neutral partial differential equations with nonlocal conditions, Nonlinear Analysis: Theory, Methods \& Applications, 67(5), 613-1622.

43. [43]	Fu, X. and Ezzinbi, K. (2003), Existence of solutions for neutral functional differential evolution equations with nonlocal conditions, Nonlinear Analysis: Theory, Methods \& Applications, 54(2), 215-227.

44. [44]	Jeet, K. (2020), Approximate controllability for finite delay nonlocal neutral integro-differential equations using resolvent operator theory, Proceedings - Mathematical Sciences, 130(62), 1-19.

45. [45]	Mokkedem, F.Z. and Fu, X. (2014), Approximate controllability of semi-linear neutral integro-differential systems with finite delay, Applied Mathematics and Computation, 242, 202-215.

46. [46]	Sell, G.R. and You, Y. (2013), Dynamic of Evolutionary Equations, Springer Science \& Business Media.

47. [47]	Luo, Z.-H., Guo, B.-Z., and Morg{\"u}l, {\"O}. (2012), Stability and Stabilization of Infinite Dimensional Systems with Applications, Springer Science \& Business Media.

48. [48]	Tang, Y. and Wang, M. (2009), A remark on exponential stability of time-delayed burgers equation, Discrete and Continuous Dynamical Systems, B12(1), 219-225.

49. [49]	Brezis, H. (2011), Functional Analysis, Sobolev Spaces and Partial Differential Equations, Springer: New York.