D. Latifi and A. Razavi, On homogeneous Finsler spaces, Rep. on Math. Phys. 57 (2006) 357-366.
D. Latifi, Homogeneous geodesics in homogeneous Finsler spaces, J. Geom. Phys ,57 (2007) , 1421-1433.
 D. Latifi and A. Razavi, Inextensible flows of Curves in Minkowskian space, Adv. Studies Theor. Phys., Vol. 2, 2008, no. 16, 761 – 768.
D. Latifi and A. Razavi, Homogeneous Geodesics of left invariant Randers metrics on three-dimensional Lie groups, Int. J. Contemp. Math. Sciences, Vol. 4, 2009, no. 18, 873 – 881.
D. Latifi and A. Razavi, On Berwald spaces which satisfy some Relations, International Mathematical Forum, 2, 2007, no. 67, 3331 – 3338.
D. Latifi, Bi-invariant Randers metrics on Lie groups, Publ. Math. Debrecen, 76, (2010) 219-226.
D. Latifi, Naturally reductive homogeneous Randers spaces, J. Geom. Phys, 60,(2010) 1968-1973.
P. Habibi, D.Latifi,, M. Toomanian, Homogeneous Geodesics and the Critical Points of the Restricted Finsler Function Journal of Contemporary Mathematical Analysis, 2011, Vol. 46, No. 1, pp. 12–16.
D. Latifi,A. A. Razavi, A symmetric Finsler space with Chern connection , arxiv.org/abs/0706.3505.
D. Latifi, Homogeneous geodesics of left invariant Finsler metrics, arxiv.org/abs/0711.4480.
D. Latifi, M. Toomanian, On a geometric characterizations of Euclidean norms Among Minkowski norms, Adv. and Appl. In Math. Scie. 10 (2011) 121-127.
D. latifi, A. Razavi, Bi-invariant Finsler metrics on Lie groups, Aust. Journ. Of Basic and Apl. Scie. 5 (2011) 507-511.
D. latifi, M. Toomanian, Invariant naturally reductive Randers metrics on homogeneous spaces. Math. Scie.6:632012.
D. Latifi, A. Razavi, Generalized projectively symmetric spaces, Geometry, 5, 2013.
D. Latifi, M. Toomanian, On the existence of bi-invariant Finsler metrics on Lie groups, Math. Scie. 7:37, 2013.
D. Latifi, Berwald manifolds with parallel S-structures, Acta Universitatis Apulensis, 36, 2013, 79-86.
D. Latifi, R. C. Khatamy, On symmetry preserving diffeomorphisms of generalized symmetric Finsler spaces, Research&Reviews:Discrete Mathematical structures, 1, 2014, 1-4
D. Latifi, M. Toomanian, On Finsler Sigma-spaces, Journal of contemp. Math. Analysis, 50, 2015, 107-115
M. Parhizkar, D. Latifi, On the flag curvature of invariant ( )-metrics, Int. J. Geom. Methods Mod. Phys. 13, 2016, 11 pages.
M. Ebrahimi, D. Latifi, M. Ebrahimi, A computer aided study of geodesics in the Schwarzschild Anti-de Sitter space-time, Int. Res. J. App. Bas. Scie. 10, 2016, 256-259.
D. Latifi, P. Bahmandoust, On Finsler s-manifolds, EUROPEAN JOURNAL OF PURE AND APPLIED MATHEMATICS, Vol. 10, No. 5, 2017, 1099-1111.
D. Latifi, M. Ebrahimi, RANDERS g.o. SPACE OF SPECIFIC TYPE, Global Journal of Advanced Research on Classical and Modern Geometries ISSN: 2284-5569, Vol.6, (2017), Issue 2, pp.106-113
 A. Fathollahzadeh, D. Latifi,  Knowledge Representation for the Geometrical Shapes, Journal of Mathematics and System Science 8 (2018) 77-83
D. Latifi, M. Parhizkar, GEODESIC VECTORS OF RANDERS METRICS ON NILPOTENT LIE GROUPS OF DIMENSION FIVE,  Global Journal of Advanced Research on Classical and Modern Geometries ISSN: 2284-5569, Vol.7, (2018), Issue 2, pp.92-101
D. Latifi, Z. Raei, CURVATURES OF TANGENT BUNDLE OF FINSLER MANIFOLD WITH CHEEGER-GROMOLL METRIC,  MATEMATIQKI VESNIK
70, 2 (2018), 134-146.
 M. Ebrahimi, D. Latifi, A. Tayebi, On the Class of Homogeneous Cubic Finsler Metrics Admitting (a,b)-Types, Journal of Physical Sciences, Vol. 23, 2018, 11-22.
 M. Parhizkar, D. Latifi, On Invariant Matsumoto Metrics, Vietnam J.  Math  (2018) ,1-11 https://doi.org/10.1007/s10013-018-0324-9
M. Ebrahimi, D. Latifi, On Flag Curvature and Homogeneous Geodesics of Left Invariant Randers Metrics on THE SEMI-DIRECT PRODUCT $frak{a}oplus_{p} frak{r}$, J. Lie Theory, 2019, 619-627.