[58] A. Shafie, M. Amini, H. Emamirad and A. Talebi Bezmin Abadi. Recombination and phenotype evolution of Helicobacter pylori in colonized hosts. J. Syst. Evol. Microbiology. (To appear).
[57] M. Amini, H. Emamirad and A. Shafiee. Conservation of ultraspherical convolution Semigroup Forum (To appear).
[56] H. Emamirad, G. R. Goldstein, J. A. Goldstein and Ph. Rogeon. The null volatility limit of the chaotic Black-Scholes equation. In: Semigroups of Operators Theory and Applications, Springer Proc. Math. Stat., 113, (2015), 155-164
[55] H. Emamirad, G. Goldstein and J. Goldstein, Corrigendum and improvement to "Chaotic solution for the Black-Scholes equation". Proc. Amer. Math. Soc. 142 (2014), 4385-4386
[54] M. A. Cherif, T. El Arwadi, H. Emamirad and J.-M. Sac-épée. , Dirichlet-to-Neumann semigroup acts as a magnifying glass. Semigroup Forum 88 (2014), 753-767
[53] H. Emamirad, G. Goldstein and J. Goldstein, Chaotic heat equation. Nonlinear Stud. 20(2) (2013), 219-224
[52] H. Emamirad and Ph. Rogeon, Semiclassical limit for Husimi function. Discrete Contin. Dyn. Syst. (Serie S). 6 (2013), 669-676
[51] H. Emamirad and M.-R. Mokhtarzadeh. Dirichlet-to-Neumann operator on the perturbed unit disk Elect. J. Diff. Equ. 159, (2012), 1-6
[50] H. Emamirad and M. Sharifitabar, On explicit representation and approximations of Dirichlet-to-Neumann semigroup. Semigroup Forum 86 (2013), 192-201
[49] M. A. Cherif, H. Emamirad and M. Mnif, Rational approximation in the sense of Kato for transport semigroups. Int. J. Finite Vol., 8:23 (2012),
[48] H. Emamirad, G. Goldstein and J. Goldstein, Chaotic solution for the Black-Scholes equation. Proc. Amer. Math. Soc. 140 (2012), 2043-2052
[47] M. A. Cherif and H. Emamirad, Approximation in the sens of Kato for transport problem. Elect. J. Diff. Equ. 99 (2009), 1-7
[46] H. Emamirad and A. Rougirel, A functional calculus approach for the rational approximation with nonuniform partitions. Discrete Contin. Dyn. Syst. 22 (2008), 955--972.
[45] H. Emamirad and I. Laadnani, An approximating family for the Dirichelet-to-Neumann semigroup. Adv. Diff. Equ. 11 (2006), 241-257
[44] T. Bermudez A. Bonilla and H. Emamirad, Chaotic tensor product semigroups. Semigroup Forum, 71 (2005),
252 - 264
[43] H. Emamirad and G. S. Heshmati, Chaotic weighted shifts in Bargmann space. J. Math. Anal. Appl. 308 (2005), 36--46.
[42] H. Emamirad and Ph. Rogeon, Scattering theory for Wigner equation. Math. Meth. Appl. Sc. 28 (2005), 947--960.
[41] H. Emamirad, On the theory of remediability, Population Dynamics Poland 2002, Publication of Banach center, 63 (2004), 177--186.
[40] R. deLaubenfels, H. Emamirad and K. G. Grosse-Erdmann, Chaos for semigoups of unbounded operators, Math. Nachr. 261-262 (2003), 47--59.
[39] H. Emamirad and Ph. Rogeon, Sur l'existence des opérateurs d'onde pour l'équation de Wigner dans les espaces L^{2,p}, C. R. Acad. Sc. Paris, sér. I, t334 (2002), 811--816.
[38] H. Emamirad and G. S. Heshmati, Pseudomesure character of the ultraspherical semigroups,Semigroup Forum, 65 (2002), 336--347.
[37] H. Emamirad and G. S. Heshmati, Spherical harmonic hypergroup and an inverse problem in transport theory, Commun. Applied Analysis, 6 (2002), 415--428,
[36] R. deLaubenfels and H. Emamirad, Chaos for functions of discret and continuous weighted shift operators, Ergodic Theory Dyn. Systems. 21 (2001), 1411--1427.
[35] H. Emamirad and Ph. Rogeon, An existence family for the Husimi equation, Transport Theory Stat. Phys. 30 (2001), 673--685.
[34] A. Decarreau, H. Emamirad and A. Intissar, Chaoticité de l'opérateur de Gribov dans l'espace de Bargmann C. R. Acad. Sc. Paris, sér. I, t 331 (2000), 751--756.
[33] R. deLaubenfels, H. Emamirad and V. Protopopescu, Linear chaos and approximation, J. Approx. Theory 105 (2000), 176--187.
[32] M. Boulanouar and H. Emamirad, The asymptotic behavior for a transport equation in cell population dynamics with a null maturation velocity, J. Math. Anal. Appl. 243 (2000), 47--63.
[31] M. Boulanouar and H. Emamirad, A transport equation in cell population dynamics, J. Diff. Integ. Equ. 13 (2000), 125-144.
[30] G. Busoni and H. Emamirad, Stationary scattering theory for a charged particles transport problem, J. Stat. Phys. 96 (1999), 377-401.
[29] H. Emamirad, Hypercyclicity in the scattering theory for linear transport equation, Trans. Amer. Math. Soc. 350 (1998), 3707-3716.
[28] H. Emamirad and R. Holtz, Coherent state vectors and entire groups on a Fréchet space, Proceeding of 28th national iranien mathematical congress, Tabriz, Iran (1997).
[27] H. Emamirad and R. Holtz, Vecteurs d'état cohérent et image de transformée de Husimi, C. R. Acad. Sc. Paris, sér. I, t.324 (1997), 1295-1300.
[26] H. Emamirad, Hyperbolicité du semi-groupe de transport et le théorème de représentation de Lax et Phillips, C. R. Acad. Sc. Paris, sér. I, t.325 (1997), 157-162.
[25] R. deLaubenfels and H. Emamirad, C-spectrality of the Schrödinger equation in Lp spaces, Letters Appl. Math. 10 (1997), 61-64.
[24] R. deLaubenfels, H. Emamirad and M. Jazar, Regularized scalar operators, Letters Appl. Math. 10 (1997), 65-69.
[23] H. Emamirad and V. Protopopescu, On the Liouville Equation in L1 Spaces, Letters Appl. Math. 9 (1996), 49-53.
[22] H. Emamirad and V. Protopopescu, Relationship between the Albedo and Scattering Operators for the Boltzmann Equation with Semi-transparent Boundary Conditions, Math. Meth. Appl. Sc. 19 (1997), 1-13.
[21] H. Emamirad and P. Arianfar, Relationship Between Scattering and Albedo Operators in Computerized Tomography, Mathematical Population Dynamics ED. O. Arino and al. Wuerz Publishing Ldt. Vol 3 (1996)
[20] P. Arianfar and H. Emamirad, Relation between Scattering and Albedo Operators in Linear Transport Theory, Transport Theory Stat. Phys. 23 (1994), 517-531.
[19] L. Autret and H. Emamirad, Entire Propagator, Proc. Amer. Math. Soc. 120, (1994) 1151-1158.
[18] R. deLaubenfels and H. Emamirad, Application de la théorie des semi-groupes C-régularisés enélasticité linéaire, C. R. Acad. Sc. Paris, sér. I, t 316 (1993), 756-762.
[17] M. Balabane, H. Emamirad and M. Jazar, Spectral Distributions and Generalization of Stone's Theorem to the Banach Space, Acta Appl. Math. 31 (1993), 275-295.
[16] H. Emamirad and M. Jazar, Applications of Spectral Distributions to some Cauchy Problems in Lp(Rn),Trends in Semigroup Theory and Evolution Equations Ed. P. Cl¶ement and al. Marcel Dekker . (1991), 143-151.
[15] H. Emamirad, Méthode de pas fractionnaires pour le modèle de Broadwell, C. R. Acad. Sc. Paris, sér. I, t 304 (1987), 487-490.
[14] H. Emamirad, Scattering Theory for Linearized Boltzmann Equation, Transport Theory Stat. Phys. 16 (1987), 503-528.
[13] H. Emamirad, On the Lax and Phillips Scattering Theory for Transport Equation, J. Funct. Analysis. 62 (1985), 286-303.
[12] M. Balabane and H. Emamirad, Lp estimates for Schrödinger evolution equation, Trans. Amer. Math. Soc. 292 (1985), 387-490.
[11] H. Emamirad, On the Lax and Phillips Scattering Theory for Transport Equation, Journées Eq. Dér. Part. Saint Jean de Monts Conf. N° 8 (1984).
[10] M. Balabane and H. Emamirad, Pseudo-differential parabolic systems in Lp(Rn), Contributions to nonlinear PDE. C. Bardos, A. Damlamian, J. I. Diaz and J. Hermndez, Pitman, Boston, London (1983),16-30.
[9] H. Emamirad, Systèmes pseudo-différentiels bien posés au sens des distributions de Beurling, Boll. Un. Mat. Ital. C 1 (1982), 303-322.
[8] M. Balabane and H. Emamirad, Systèmes pseudo-différentiels paraboliques dans Lp(Rn), C. R. Acad. Sc. Paris, sér. I, t 292 (1981),473-476.
[7] H. Emamirad and B. Mehri, On the existence of the periodic solutions for n'th-order nonlinear differential equation, Acad. Naz. dei Lincei, 66 (1979), 516-522.
[6] M. Balabane and H. Emamirad, Smooth distributions group and Schrödinger equation in Lp(Rn), J. Math. Anal. Appl. 70 (1979), 61-71.
[5] H. Emamirad and B. Mehri, On the existence of the periodic solutions for autonomous second order systems, Nonlinear Analysis. 3 (1979), 577-582.
[4] H. Emamirad, Semi-groupes ultra-contractif et schema de Crank-Nicholson dans un espace de Banach, C. R. Acad. Sc. Paris, sér. I, t 280, (1978 ), 343-345.
[3] H. Emamirad and B. Mehri, On the existence of the periodic solutions for n'th-order nonlinear differential differential equation, J. Diff. Eq. 29 (1979), 297-303.
[2] H. Emamirad, Semi-groupes distributions engendrés par A^\alpha, C. R. Acad. Sc. Paris, sér. I, t 287 (1975 ), 337-339.