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1Persistence and global attractivity in the model A_{n+1}=A_nF_n(A_n,A_{n−1},…,A_{n−m}). Acta Math. Vietnam. 34 (2009), 299–304.
2Persistence and global attractivity in the model $A_{n+1} = qA_n + F_n(A_n, A_{n-1},\cdots,A_{n-m})$, Communications in Nonlinear Science and Numerical Simulation, 14 (2009), 1115-1120.
3Persistence and global attractivity in the model $A_{n + \,1}  = A_n F_n \,(A_{n,\,} A_{n - 1} ,\,...\,,\,A_{\,n - m} )$,  Acta Math. Vietnamica, 34 (2009), 299-304.
4, Y. Lenbury, Periodicity and knots in delay models of population growth, Math. Comput. Modelling 47 (2008), 259 - 265.
5, Y. Lenbury; A. De Gaetano and P. Palumbo, Delay model of glucose-insulin systems: global stability and oscillated solutions conditional on delays, J. Math. Anal. Appl. 343 (2008), N0 2, 996 - 1006.
6, Dinh Cong Huong, Nontrivial Perivdicity in discrete delay models of population grouth. J. Math. Anal. Appl. 305 (2005), 291 - 295.
7Y. Lenbury, Nonlinear delay differential equations involving population growth, Math. Comput. Modelling 40 (2004), N0 5-6, 583 - 590.
8, D. C. Huong, Nilpotent matrices and dynamical systems, Adv. Stud. Contemp. Math. (Kyungshang) 8 (2004), 65 - 72.
9Sobolev spaces and approximation by Fourier transforms, Southeast Asian Bull. Math. 27 (2003), N0 1, 35 - 54.
10Logarithmic integrals, Sobolev spaces and Radon transform in the planeActa Math. Vietnam. 28 (2003), N0 3, 297 - 307.
11On the recursive sequence x_{n+1} = \frac{(Ax_n+B)}{(x_n +ax_{n-1}+b)}, Far East J. Dyn. Syst. 3 (2001), 141 - 148.
12M. Bagota, F. Móricz, On the order of magnitude of Fourier transforms. Acta Math. Hungar. 75 (1997), 227 - 243.
13, F. Móricz, The Cesaro operator on the multiparameter Hardy space $\mathcal H^1 (T \times T)$. Analysis 17 (1997), 155 - 174.
14, F. Móricz, The two dimensional Cesaro operator on the multiparameter Hardy space $\mathca H^1(\mathbb R \times \mathbb R). Acta Sci. Math. (Szeged) 63 (1997), 279 - 288.
15, Ferenc Moricz, On the L1-convergence of Fourier transforms. J. Austral Math. Soc. Ser. A 60 (1996), 405 - 420.
16, Ferenc Moricz, The Cesaro operator on the Banach algebra of L1(R2) multipliers I (Odd case). Acta Sci. Math. (Szeged) 62 (1996), 433 - 456.
17, Ferenc Móricz, On the L^1-theory of Fourier transforms and Multipliers. Acta Sci. Math. (Szeged) 61 (1995), 293 - 304.
18, Ferenc Móricz, The Cesaro operator is bounded on the Hardy space H^1. Acta Sci. Math. (Szeged) 61 (1995), 535 - 544.
19, F. Moricz, Strong Approximation by Fourier Transforms and Fourier Series in $L^{\infty}$-norm. J. Approx. Theory 83 (1995), 157 - 174.
20, Ferenc Móricz, Lebesgue integrability of Fourier transforms. Acta Sci. Math.(Szeged) 60 (1995), 329 - 343.
21, Ferenc Móricz, The Cesaro operator on the Banach algebra of L_1(R^2) multipliers III (Even-Odd case). Acta Math. Hungar. 68 (1995), 71 - 98.
22Fourier analysis. Ph. D. Thesis, Hungarian Academy of Science (1994).
23, F. Móricz, The strong summability of Fourier transforms. Acta Math. Hungar. 65 (1994), 403 - 419.
24, Ferenc Móricz , Cesaro means of Fourier transforms and multipliers on L^1(\mathbb R). Proc. Amer. Math. Soc. 122 (1994), 469 - 477.
25, Ferenc Móricz, Multipliers of Fourier transforms and series on L^1. Archiv Math. (Basel) 62 (1994), 230 - 238.
26, F. Moricz, Strong approximation by Dirichlet integrals in L^{\laqmbda} (R)-norm, 1< \lambda \infty, J. Approx. Theory 79 (1994), 271 - 286.
27, Ferenc Móricz, The Cesaro operator on the Banach algebra of L (\mathbb R^2) multipliers II (Even case). Acta Sci. Math. (Szeged) 59 (1994), 625 - 655.
28, Ferenc Móricz, On the uniform and absolute convergens of Dirichlet integrals of functions in Besov space. Acta Sci. Math. (Szeged) 59 (1994), 257 - 265.
29, Ferenc Móricz, Multipliers of double Fourier transforms and series on L^1. Acta Sci. Math. (Szeged) 58 (1993), 329 - 348.
30, Ferenc Móricz, Lebesgue integrability of Double Fourier transforms. Acta Sci. Math. (Szeged) 58 (1993), 299 - 328.
31Approximation on real line by Fourier transform. Acta Sci. Math. (Szeged), 58 (1993), 197 - 209.
32, I. Gyori, Oscillation of a linear neutral delay differential equation with unbounded time lag. Diff. Eq. Dynam. Systems 1 (1993), 267 - 274.
33, Ferenc Móricz, On the integrability of trigonometric series. Anal. Math. 18 (1992), 15 - 23.
34On the exactness of a theorem of F.A. Fomin. Anal. Math. 17 (1991), 133 - 140.
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