Publication

1

M. Tlemcani, “A Two-Scale Asymptotic Analysis of a Time-Harmonic Scattering Problem with a Multi Layered Thin Periodic Domain”, comm. In Comp. Phys (CiCP) 6 (2009), pp. 758-776.

 https://journal.global-sci.org/intro/article_detail.html?journal=undefined&article_id=7704

2

H. Barucq, J. Diaz, M. Tlemcani, “New absorbing layers conditions for short water waves”, J. Comp. Phys 229 (2010) 58–72. https://www.sciencedirect.com/science/article/abs/pii/S0021999109004732

3

Z. Benkamra, M. Terbeche, M. Tlemcani, “Procédure d’échantillonnage efficace – Estimation de la fiabilité des systèmes séries/Parallèles »,  Revue ARIMA, vol. 13 (2010), pp. 119-133. https://inria.hal.science/hal-01286817 

4

Z. Benkamra, M. Terbeche, M. Tlemcani, “ Two Stage Design for Estimating the  Reliability of Series/Parallel Systems»,  Mathematics and Computers in Simulation 81 (2011) 2062–2072. https://www.sciencedirect.com/science/article/abs/pii/S0378475411000322 

5

Z. Benkamra, M. Terbeche, M. Tlemcani, “ An Allocation Scheme for Estimation the  Reliability of a Parallel-Series System»,  Advances in Decision Sciences, Volume 2012. (2012), Article ID 289035, 14 pages, doi:10.1155/2012/28903   https://www.emis.de/journals/HOA/ADS/Volume2012/289035.abs.html  

6

Z. Benkamra, M. Terbeche, M. Tlemcani, “Bayesian Sequential Estimation of the  Reliability of a Parallel-Series System »,  Applied Mathematics and Computation 219 (2013) 10842–10852. https://www.sciencedirect.com/science/article/abs/pii/S0096300313005298  

7

Benkamra, Zohra; Terbeche, Mekki; Tlemcani, Mounir. Nearly second order three-stage design for estimating a product of several Bernoulli proportions. J. Statist. Plann. Inference 167 (2015), 90–101.. https://www.sciencedirect.com/science/article/abs/pii/S0378375815001111

8

Tami, Abdelkader; Tlemcani, Mounir.  $H^2$ convergence of solutions of a biharmonic problem on a truncated convex sector near the angle $\pi$. Appl. Math. 66 (2021), no. 3, 383–395.

https://link.springer.com/article/10.21136/AM.2021.0284-19

9

Baara, Nacéra; Diaz, Julien; Tlemcani, Mounir. Time domain analysis and localization of a non-local PML for dispersive wave equations. J. Comput. Phys. 445 (2021), Paper No. 110638, 18 pp.  https://www.sciencedirect.com/science/article/abs/pii/S0021999121005337

10

Benkamra, Zohra; Terbeche, Mekki; Tlemcani, Mounir. Sequential design for estimating the product of two non-simultaneously zero means. Journal of Statistics and Computer Science, 1(1) (2022). https://www.arfjournals.com/image/catalog/Journals%20Papers/JSCS/2022/No%201%20(2022)/6_Zohra%20Benkamra.pdf

11

Salhi, Khedidja; Tlemcani, Mounir. Time-domain Green’s function associated to the interface problem for the Klein-Gordon equation. Wave Motion 121 (2023), Paper No. 103181, 9 pp.  https://www.sciencedirect.com/science/article/abs/pii/S0165212523000677

12

Basset, Sihem; Benkamra, Zohra; Tlemcani, Mounir. Penalty Sponge Layers (PSL) for hyperbolic systems. General formulation, well-posedness and stability. J. Comput. Phys. 510 (2024), Paper No. 113087, 17 pp. https://www.sciencedirect.com/science/article/abs/pii/S002199912400336X

13

Douah, Abdelaziz; Tami, Abdelkader; Tlemcani, Mounir. Sharp estimates of solution of an elliptic problem on a family of open non-convex planar sectors. Math. Methods Appl. Sci. 48 (2025), no. 2, 2529–2544. https://onlinelibrary.wiley.com/doi/abs/10.1002/mma.10449

14

A Benkhaled, A Hamdaoui; General classes of shrinkage estimators for the multivariate normal mean with unknown variance: Minimaxity and limit of risks ratios; Kragujevac J. Math 46 (2) (2022), 193-213. https://imi.pmf.kg.ac.rs/kjm/en/index.php?page=10.46793/KgJMat2202.193B

15

H Abdenour, B Djamel; Asymptotic properties of risks ratios of shrinkage estimators; Hacettepe Journal of Mathematics and Statistics 44 (5) (2015), 1181-1195. https://dergipark.org.tr/en/pub/hujms/issue/49537/524506

16

D Benmansour, A Hamdaoui; Limit of the ratio of risks of James-Stein estimators with unknown variance; Far East J. Theo. Stat 36 (2011), 31-53.

https://www.pphmj.com/abstract/6141.htm

17

A Hamdaoui, A Benkhaled, M Terbeche; Baranchick-type estimators of a multivariate normal mean under the general quadratic loss function; Journal of Siberian Federal University. Mathematics & Physics 2020, 13(5).

 https://elib.sfu-kras.ru/handle/2311/135903

18

A Hamdaoui, N Mezouar; Risks Ratios of shrinkage estimators for the multivariate normal mean; Journal of Mathematics and Statistics, Science Publication 13 (2), 77-87. https://thescipub.com/pdf/jmssp.2017.77.87.pdf

19

Hamdaoui, A.; Almutiry, W.; Terbeche, M.; Benkhaled, A. Comparison of Risk Ratios of Shrinkage Estimators in High Dimensions. Mathematics 2022, 10, 52. https://doi.org/10.3390/math10010052

20

A Hamdaoui, N Mezouar, D Benmansour, D Bouguenna; Examples of shrinkage estimators of the mean, dominating the maximum likelihood estimator in larges dimension; IOSR Journal of Mathematics 12 (3) (2016), 14-28.

https://www.iosrjournals.org/iosr-jm/pages/v12(3)Version-4.html

21

A Benkhaled, A Hamdaoui, W Almutiry, M Alshahrani, M Terbeche; A study of minimax shrinkage estimators dominating the James-Stein estimator under the balanced loss function; Open Mathematics 20 (1) (2016), 1-11.

https://www.degruyter.com/document/doi/10.1515/math-2022-0008/html?srsltid=AfmBOooQq1O2xWduZbfscJ4pfQ_ZwHmXUoWQ3AyKvR3whk_i8Tq0e9kt

22

A Benkhaled, A Hamdaoui, M Terbeche; Minimax shrinkage estimators and estimators dominating the James-Stein estimator under the balanced loss function; Eurasian Mathematical Journal 13 (2) (2022), 18-36.

https://www.mathnet.ru/links/2c5b18cccc5ec93b374353accc91588e/emj435.pdf

23

Hamdaoui, Abdenour. « On shrinkage estimators improving the positive part of James-Stein estimator » Demonstratio Mathematica, vol. 54, no. 1, 2021, pp. 462-473. https://doi.org/10.1515/dema-2021-0038

24

A Hamdaoui, A Benkhaled, M Terbeche, On Minimaxity and Limit of Risks Ratio of James-Stein Estimator Under the Balanced Loss Function; Kragujevac Journal of Mathematics 47 (3) (2023), 459-479.

https://imi.pmf.kg.ac.rs/kjm/pub/kjom473/kjm_47_3-10.pdf

25

A Hamdaoui, A Benkhaled, M Alshahrani, M Terbeche, W Almutiry, …; [Retracted] On Some Classes of Estimators Derived from the Positive Part of James–Stein Estimator; Journal of Mathematics 2023 (1), 5221061.

https://onlinelibrary.wiley.com/doi/10.1155/2023/5221061#

26

Hamdaoui, A., Terbeche, M., & Benkhaled, A. (2021). On shrinkage estimators improving the James-Stein estimator under balanced loss function. Pakistan Journal of Statistics and Operation Research, 17(3), 711-727. https://doi.org/10.18187/pjsor.v17i3.3663

27

Ilham Abi-ayad, Tahar Mourid ; Parametric estimation for non recurrent diffusion processes ; Statistics & Probability Letters ; Volume 141 ; 2018 ; Pages 96-102.

https://doi.org/10.1016/j.spl.2018.05.024.

1

A. Tami, The elliptic problems in a family of planar open sets, Applications of Mathematics 64 (5), 485-499, https://link.springer.com/article/10.21136/AM.2019.0057-19.

2

A. Tami, M.Tlemcani, H² Convergence of Solutions of a Biharmonic Problem on a Truncated Convex Sector Near the Angle π, Applications of Mathematics 66 (3), 383-395, https://link.springer.com/article/10.21136/AM.2021.0284-19

3

A Douah, A Tami, M Tlemcani, Sharp estimates of solution of an elliptic problem on a family of open non‐convex planar sectors, Mathematical Methods in the Applied Sciences 48 (2), 2529-2544. https://onlinelibrary.wiley.com/doi/abs/10.1002/mma.10449

4

C Bouzar, R Chaili, Gevrey vectors of multi-quasi-elliptic systems, Proceedings of the American Mathematical Society, 1565-1572, https://www.jstor.org/stable/1194123

5

C Bouzar, R Chaili, Une généralisation du problème des itérés, Archiv der Mathematik 76, 57-66, https://www.researchgate.net/profile/Chikh-Bouzar/publication/226585516_Une_generalisation_du_probleme_des_iteres/links/580b137808ae2cb3a5d34b59/Une-generalisation-du-probleme-des-iteres.pdf

6

C Bouzar, R Chaili, Vecteurs Gevrey d’opérateurs différentiels quasihomogènes, Bulletin of the Belgian Mathematical Society-Simon Stevin 9 (2), 299-310, https://projecteuclid.org/search?term=Vecteurs+Gevrey+d%27op%C3%A9rateurs+diff%C3%A9rentiels+quasihomog%C3%A8nes

7

C Bouzar, R Chaili, A Gevrey microlocal analysis of multi-anisotropic differential operators, arXiv preprint math/0603321

8

C Bouzar, R Chaili, Régularité des vecteurs de Beurling de systèmes elliptiques, Maghreb Math. Rev 9 (1), 43-53, https://scholar.google.com/scholar?hl=fr&as_sdt=0,5&cluster=15434922507622323956

9

R Chaili, Systems of differential operators in anisotropic Roumieu classes, Rendiconti del Circolo Matematico di Palermo 62 (2), 189-198, https://link.springer.com/article/10.1007/s12215-012-0101-7

10

R Chaili, T Mahrouz, Comparison of iterates of a class of differential operators in Roumieu spaces, Publications de l’Institut Mathematique 101 (115), 261-266, https://doiserbia.nb.rs/Article.aspx?ID=0350-13021715261C

11

Rachid Chaïli, Mustapha Djilali, Iterate problem in Roumieu spaces of systems of interior and boundary differential opertors, Rendiconti. Sem. Mat. Univ. Pol. Torino, Vol. 76, 1, (2018), 41-54. https://seminariomatematico.polito.it/rendiconti/76-1/41.pdf

12

M’Hamed Bensaid, Rachid Chaïli, On the non-triviality of anisotropic Roumieu Gelfand–Shilov spaces and inclusion between them. Georgian Math. J., 31(2), 181-186, https://www.degruyter.com/document/doi/10.1515/gmj-2023-2087/html

13

M’Hamed Bensaid, Rachid Chaïli, Iterates of differential operators of Shubin type in anisotropic Roumieu Gelfand-Shilov spaces, Bull. Sci. Math. 192, (2024), 103404, https://www.sciencedirect.com/science/article/abs/pii/S0007449724000228

14

Chiara Boiti, Rachid Chaïli, Tayeb Mahrouz, Iterates of systems of operators in spaces of ω-ultradifferentiable functions. ANN POL MATH, 118.2-3, (2016), 95-111. DOI: 10.4064/ap4024-12-2016, https://arxiv.org/abs/1606.00222.

15

16

17

M. Benchohra, J. Henderson and I. Medjadj:Global existence results for functional differential inclusions with State-Dependent Delay, Mathematical Modelling and Analysis, Volume: 19, Issue: 04, (2014), page 524-536(10.3846/13926292.2014.959084.)

https://journals.vilniustech.lt/index.php/MMA

18

M. Benchohra and I. Medjadj, Global existence results for neutral functional differential equations with state-dependent delay, Differential Equations and Dynamical Systems Vol. 24 No. 2 (2016), 189-200. https://link.springer.com/journal/12591

19

M.Benchohra and I. Medjadj, Global existence results for second order neutral functional differential equations with state-dependent delay, Commentationes Mathematicae Universitatis Carolinae Vol. 57 No. 2 (2016), 169-183. https://cmuc.karlin.mff.cuni.cz/

20

M.Benchohra,  I. Medjadj, Measure of noncompactness and  partial functional differential equations with state-dependent delay, Differential Equations and Dynamical Systems, (2018) 26:139-155 DOI 10.1007/s12591-016-0325-7. https://link.springer.com/journal/12591

21

M.Benchohra, J. Henderson and I. Medjadj, Measure of noncompactness and  neutral functional differential equations with state-dependent delay, Journal of Mathematics and Applications. No 39, (2016), pp 23-45. https://jma.prz.edu.pl/en/

22

E.Alaidarous and M. Benchohra and I. Medjadj,  Global existence results for neutral functional differential inclusions with state-dependent delay, Ukr. Mat. Zh. (2018). – vol. 70, No 11. – pp. 1443-1456. https://link.springer.com/article/10.1007/s11253-019-01598-8

23

E.Alaidarous and M. Benchohra and I. Medjadj,  Global Existence Results for Second Order Functional Differential Equations with Delay, University of Nis, Serbia,Filomat 33:3 (2019), 773–787. https://www.pmf.ni.ac.rs/filomat/

24

Rahla, Ryma Imene; Serra-Capizzano, Stefano; Tablino-Possio, Cristina. Spectral analysis of $\Bbb P_k$ finite element matrices in the case of Friedrichs-Keller triangulations via generalized locally Toeplitz technology. Numer. Linear Algebra Appl. 27 (2020), no. 4, e2302, 28 pp. https://onlinelibrary.wiley.com/doi/abs/10.1002/nla.2302

25

Paola Ferrari,Ryma Imene Rahla,Cristina Tablino-Possio,Skander Belhaj andStefano Serra-Capizzano, Multigrid for Q k Finite Element Matrices Using a (Block) Toeplitz Symbol Approach, Mathematics 2020, 8(1), 5, https://www.mdpi.com/2227-7390/8/1/5    

1

Bekkara Samir; Zeghib Abdelghani, On Rigidity of generalized conformal structure. Geometriae Dedicata. DOI:10.1007/s10711-017-0217-1 (Published online: 11 January 2017).

https://link.springer.com/journal/10711

2

Bekkara Samir; Zeghib Abdelghani, Singular Riemannian metrics, Sub-rigidity versus Rigidity. Math. Res. Lett. 18 (2011), no. 06, 1203–1214.

https://intlpress.com/journals/journalList?id=1804416324302073857

3

Bekkara Samir; Messirdi Bekkai; Senoussaoui Abderrahmane,  A class of generalized integral operators, Electronic Journal of Differential Equations, Vol. 2009(2009), No. 88, pp. 1-7.

https://ejde.math.txstate.edu/

4

 Bennouar abdelmadjid, Ouakkas Sedik, Some constructions of biharmonic maps on the warped product Manifolds, cmuc, (2017) 58, 4, 481-500

https://cmuc.karlin.mff.cuni.cz/cmuc1704/abs/bennou.htm

5

Difi Sidahmed,  Minimal translation factorable surfaces in hyperbolicspace. http://periodicos.ufv.br/jcec/Qualis

6

Difi Sidahmed, Translation-factorable surfaces in the 3-dimensional Euclidean and Lorentzian spaces satisfying∆ ri= λi, ri.https://ejmaa.journals.ekb.eg/

7

F.Hathout and M.H.Dida “Diagonal Lift in the Tangent Bundle of Order Two and its
Applications” Turk. J. Math., 30, (2006), 373-384.

8

M. H. Dida, F. Hathout and M. Djaa “On the geometry of the second order tangent
bundle with the diagonal lift metric” Int. Journal of Math. Analysis, Vol. 3, 2009, no. 9,
443-456.

9

H.M. Dida and A. Ikemakhen “A class of metrics on tangent bundles of pseudoRiemannian manifolds” ARCHIVUM MATHEMATICUM (BRNO), Tomus 47 (2011), 245-
260.

10

Bouazza Kacimi, Fouzi Hathout, H. Mohamed Dida and Mokhtaria Barnoussi , ParaQuaternionic Structures on the 3-Jet Bundle. Mathematical Sciences and Applications
E-NOTES 4 (2) 37-46 (2016).

11

Hamou Mohammed Dida, Fouzi Hathout and Abdelhalim Azouz, On the geometry of
the tangent bundle with vertical rescaled metric. Commun. Fac. Sci. Univ. Ank. Ser. A1
Math. Stat. Volume 68, Number 1, Pages 222-235 (2019).

12

H. Mohammed Dida and Fouzi Hathout, Ricci Soliton on the tangent Bundle with
Semi-Symmetric Metric Connection. Bulletin of the Transilvania University of Braşov
Series III: Mathematics and Computer Science, Vol. 1(63), No. 2 – 2021, 37-52.

13

Mohamed H. Dida and Fouzi Hathout, Killing magnetic flux surfaces in Heisenberg
three-group. Facta Universitatis (NIŠ) Ser. Math. Inform. Vol. 37, No 5 (2022), 975-
991.

14

Khadidja Derkaoui, Fouzi Hathout and Hamou Mohammed Dida, Slant curves and
Legendre curves in three-dimensional Walker manifolds. Asian-European Journal of
Mathematics (2023).

15

Dida H. M. & F. Hathout. Semi-symmetric types on hyperbolic Kenmotsu
manifolds. General Letters in Mathematics, 14 (3) (2024), 63-74,
10.31559/glm2024.14.3.3

16

N. Bekkouche, F. Hathout, Explicit formulas for flux surfaces and scalar flux
functions according to Killing magnetic vectors in SL(2,R), JJMS 17, No. 3, 363-
376 (2024 ). doi.org/10.47013/17.3.4

17

N. Benmansour and F. Hathout, Flux Surfaces According to Killing Magnetic
Vectors in Riemannian Space Sol3, Fund. J. of Math. and App. , Vol. 6, Issue 2,
(2023), 89-100. doi.org/10.33401/fujma.1163741

18

F. Hathout, A new class of curves generalizing helix and rectifying curves, Int. J. of Geo.,
11(4)(2022): 65-74.

19

M. Bekar, F. Hathout and Y. Yayli, Developable surfaces generated by using moving
frame, Journal of Science and Arts, Volume 22, Issues 2, pp. 413-438, (2022).
doi.org/10.46939/J.Sci.Arts-22.2-a15

20

M. Bekar, F. Hathout and Y. Yayli, Singularities of rectifying developable surface of
Legendre curves on UTS2, Inter. J. of Geometry Vol. 11 (2022), No. 4, 20 – 33

21

BekarM., Hathout F., and Yayli Y. “Legendre Curves and the Singularities of Ruled
Surfaces Obtained by Using Rotation Minimizing Frame”. Ukrainian Mathematical
Journal, 73, 686–700 (2021). doi.org/10.1007/s11253-021-01953-8

22

Kacimi, B., Özkan, M. & Hathout, F. Bifoliated Homotopy Invariant and Metallic
Submersions. Mediterr. J. Math. 18, 163 (2021). doi.org/10.1007/s00009-021-01801-w

23

K.Derkaoui et F.Hathout, Explicit formulas for Killing magnetic curves in threedimensional Heisenberg group, Int. J. of Geo. Meth. in Modern Phy., Vol. 18, No. 09,
2150135 (2021). doi/10.1142/S0219887821501358

24

F.Hathout and Y.Yayli. Darboux vectors and the spherical indicatrix curves satisfyingthe
Tzitzeica condition in Minkowski space, Rom. J. of Math. and Computer Sc., 2018, 8(1):
7-16.

25

M Bekar, F Hathout, Y Yayli, N-Legendre and N-slant curves in the unit tangent bundle
of Minkowski surfaces, Asian-European J. of Math.,2018, 11 (01), 1850008

26

M Bekar, F Hathout, Y YAYLI, Tangent bundle of pseudo-sphere and ruled surfaces in
Minkowski 3-space, General Letters in Math, 2018, 5, 58-70

27

F.Hathout, M.Bekar and Y.Yayli, N-Legendre and N-Slant Curves in the Unit Tangent
Bundle of Surfaces. Kuwait Journal of Science, 44(3), 2017.

28

F Hathout, M Bekar, Y Yayli. Ruled surfaces and tangent bundle of unit 2-sphere, Int. J.
of Geo. Meth. in Modern Phy. 14 (10)(2017), 1750145

29

K. Djerfi, F. Hathout and B. Messirdi, Perturbation and Stability of the Signature
Operator on a Riemannian Manifold. Gen. Math. Notes, Vol. 12, No. 1, September 2012,
pp. 1-10.

30

F. Hathout and M. Djaa “Basic signature and Applications” Result.Math Result.Math. 54
(2009), 75–84

31

Sur la géométrie de la singularité initiale des espaces-temps plats globalement hyperboliques. M Belraouti

Annales de l’Institut Fourier 64 (2), 457-466

https://aif.centre-mersenne.org/articles/10.5802/aif.2854/

32

Asymptotic behavior of Cauchy hypersurfaces in constant curvature space–times

M Belraouti Geometriae Dedicata 190 (1), 103-133

https://link.springer.com/article/10.1007/s10711-017-0230-4?fromPaywallRec=false

33

Pseudo-Conformal actions of the Möbius group

M Belraouti, M Deffaf, Y Raffed, A Zeghib

Differential Geometry and its Applications 91, 102070

https://www.sciencedirect.com/science/article/abs/pii/S0926224523000967

34

Asymptotic behavior of Moncrief Lines in constant curvature space‐times

M Belraouti, A Mesbah, L Messaci

Bulletin of the London Mathematical Society

https://londmathsoc.onlinelibrary.wiley.com/doi/10.1112/blms.70032