Expérience et Compétences Des Equipes Du Laboratoire
A- Publications Internationales |
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1 |
The time-dependent linear potential in the presence of minimal length, |
2 |
Bosonic oscillator in the presence of minimal lengths, M. Falek and M. Merad. : Journal of Math physics . 50 (2009) 023508. |
3 |
Generalization of Bosonic oscillator in the presence of minimal lengths, M. Falek and M. Merad. |
4 |
Duffin-Kemmer-Petiau equation in Robertson-Walker space-time, M. Falek and M. Merad., Central European Journal of Physics, 8(2010)408. |
5 |
Exact Solution to the Scalar DKP Equation in (1+3)-dimensional Robertson–Walker Space-Time, M. Falek and M. Merad. International Journal of Modern Physics A , 25, (2010) 2747. |
6 |
Spinless Relativistic Particle in the Presence of, A Minimal Length, M. Merad, F. Zeroual and H. Benzair Electronic Journal of Theoretical Physics 7 (2010) 41. |
7 |
Relativistic oscillators in a Non Commutative space: Path integral appraoch. H.Benzair, M. Merad., T.Boudjedaa and A.Makhlouf, Zeitschrift für Naturforschung A. Vol. 67a (2012). |
8 |
Relativistic equation in electromagnetic fields with a generalized uncertainly principle, M. Merad , F. Zeroual and M. Falek, Modern PhysicsLetters A, Vol 27, 15 ( 2012) 1250080. |
9 |
Path Integral for Dirac oscillator with generalized uncertainty principle. . H.Benzair,T.Boudjedaa and M. Merad; Journal of Math physics 53, 123516 (2012). |
10 |
Adomian Decomposition Method for Solution of Parabolic Equation to Nonlocal Conditions, Int. J. Contemp. Math. Sciences, Vol 6, 2011, no30, 1491-1496, A. Merad, |
11 |
Strong solution for a high order boundary value problem with integral condition, Turk J Math, doi: 10.3906/math-1105-34, A.Merad and A.L. Marhoune. |
12 |
A Method of Solution for Integrodifferential Parabolic Equation with purely Integral Conditions, Advances in Applied Mathematics and Approximation Theory, Springer Proceeding in Mathematics and Statistics 41, DOI 10.1007/978-1-4614-6393-1_20, New York 2013, Ahcene Merad and Abdelfatah Bouziani. |
13 |
Aliouche Abdelkrim, Merghadi Faycel, A common fixed point theorem via a generalized contractive condition, Annales Mathematicae et Informaticae36 (2009) pp. 3. |
14 |
Aliouche Abdelkrim and V. Popa, General common fixed point theorems for occasionally weakly compatible hybrid mappings and applications, Novi Sad J. Math. Vol. 39, No. 1, 2009, 89-109. |
15 |
ABDELKRIM ALIOUCHE, FAYCEL MERGHADI AND AHCENE DJOUDI, A RELATED FIXED POINT THEOREM IN TWO FUZZY METRIC SPACES, J. Nonlinear Sci. Appl. 2 (2009), no. 1, 19–24. |
16 |
Sahban Sedghi, Nabi Shobe and , Abdelkrim Aliouche, AGeneralization of fixed point theorem in S-metric spaces, Mathmat, 64, 3(2012)258. |
17 |
A. Aliouche and A A. Djoudi Common Fixed Point Theorem for Single-Valued and Set-Valued Mappings Satisfying A Generalized Contractive Condition, Thai Journal of Mathematics Volume 8 (2010) Number 3 : 459–467 |
18 |
A. Aliouche, COMMON FIXED POINT THEOREME IN FUZZY METRIC SPACES VAI PROPERTIES Albanian journal of mathematics Volume 4, NO 3, P 67-77(2010) .3 |
19 |
A. Aliouche and V. Popa, COMMON FIXED POINT THEOREMS FOR OCCASIONALLYWEAKLY COMPATIBLE MAPPINGS IN COMPACT METRIC SPACES, Acta Universitatis Apulensi, No. 28/2011 pp. 203-214. |
20 |
] A. Aliouche, Common Fixed point theorem via implicit relations , Miskolc Mathematical Notes Vol.11(2010) n°1,pp3. |
21 |
F. Merghadi and A. Aliouche, A related fixed point theorem in three intuitionistic fuzzy metric spaces, J. Math. Comput. Sci. 2 (2012), No. 6, 1573-1587 |
22 |
Faycel Merghadi, Abdelkrim Aliouche, A RELATED FIXED POINT THEOREM IN n COMPLETE FUZZY METRIC SPACES, Journal of Nonlinear Analysis and Optimization : Theory & ApplicationsVol. 3 issue 2, (2012), 293- |
23 |
M. Bragdi and M. Hazi, Controllability for systems governed by semilinear fractional differentialinclusion in a Banach spaces, Adv. Dyn. Sys. Appl., 7 (2) (2012), 163–170. |
24 |
M. Bragdi and M. Hazi, Existence and uniqueness of solutions of fractional quasilinear mixedintegrodifferential equations with nonlocal condition in Banach spaces, E. J. Qualitative Theory of Diff. Equ., No. 51 (2012), pp. 1-16. |
25 |
M. Hazi and M. Bragdi, Controllability of fractional integrodifferential systems via semigroup theory inBanach space, Math. J. Okayama Univ. 54 (2012), 133–143. |
26 |
M. Bragdi and M. Hazi, Existence and controllability result for evolution fractional integrodifferentialsystems, Int. J. Contemp. Math. Sciences, Vol. 5 (2010), no. 19, 901–91. |
27 |
M. Slodička , S. Dehilis, A numerical approach for a semilinear parabolic equation with a nonlocal .boundary Condition,Journal of Computational and Applied Mathematics 231 (2009) p715- p724 |
28 |
M. Slodička , S. Dehilis, A nonlinear parabolic equation with a nonlocal boundary term, Journal of Computational and Applied Mathematics 233 (2010) p3130-3138 |
29 |
Amel Berhail and Abdelhamid Ayadi, Estimation of pollution ter in Petrowski system with incomplete data, Int. J. Open Problems Comp. Math., Vol. 3, N°4, Decembre 2010,PP27-36. |
30 |
Khaireddine Fernane, Abdelhamid Ayadi, Dual Variational Formulation Applied to An Acoustic Model Problem, Int. Journal of math. Analysis, vol. 4, 2010, N° 23, 1117-1133. |
31 |
A. Cheniguel, A. Ayadi, Solving non homogeneous heat equation by the Adomian decomposition method. International journal of numerical methods and applications, Volume 4, Number 2, 2010, pp 89-97`. |
32 |
A. Cheniguel, A. Ayadi, Solving heat equation by the Adomian decomposition method, Inter Mathem Forum, Vol.6, 2011, N°13, PP 639. |
33 |
Khaireddine Fernane, Mohamed Dalah and Abdelhamid Ayadi, Existence and uniqueness solution of a quasistatic electro-elastic antiplane contact problem with Tresca friction lawApplied Sciences, Vol.14, 2012, pp. 45-59." Balkan Society of Geometers, Geometry Balkan Press 2012." |
34 |
Rezzoug Imad and Abdelhamid Ayadi, Weakly Sentinels for the Distributed System with MissingTerms and with pollution in boundary conditions, Int. Journal of math. Analysis, vol. 6, 2012, N° 46, 2245-2256. |
35 |
Related fixed point on two metric spaces Taieb Hamaizia and Abdelkrim Aliouche, Palestine Journal of MathematicsVol. 2(1) (2013) , 1. |
36 |
Differential Equations Generating Densifying Curves |