Rough Set Theory (RST) is an essential mathematical tool to deal with imprecise, inconsistent, incomplete information and knowledge Rough Some algebra structures, such as groups, rings, and modules, have been presented on rough set theory. The sub-exact sequence is a generalization of the exact sequence. In this paper, we introduce the notion of a sub-exact sequence of groups. Furthermore, we give some properties of the rough group and rough sub-exact sequence of groups.

Aminizadeh, R., Rasouli, H., & Tehranian, A. (2018). Quasi-exact sequences of s-acts. Bull.Mallays. Math.Sci.Soc., 42, 2225–2235.

Bagirmaz, N. (2019). Direct products of rough subgroups. Eskişehir Technical University Journal of Science and Technology A - Applied Sciences and Engineering, 20(3), 307–316.

Bagirmaz, N., & Ozcan, A. F. (2015). Rough semigroups on approximation spaces. International Journal of Algebra, 9(7), 339–350.

Biswas, R., & Nanda, S. (1994). Rough groups and rough subring. Bull. Polish Acad. Sci. Math., 42, 251–254.

Davvaz, B. (2004). Roughness in rings. Information Sciences, 164, 147–163.

Davvaz, B., & Mahdavipour, M. (2006). Roughness in modules. Information Sciences, 176, 3658–3674.

Davvaz, B., & Parnian-Garamaleky, Y. A. (1999). A note on exact sequences. Bulletin of The Malaysian Mathematical Society, 22, 53–56.

Elfiyanti, G., D. Nasution, I. M., & Amartiwi, U. (2016). Abelian property of the category of U-complexes chain of U-complexes. Int. J. Math. Anal., 10(17), 849–853.

Faisol, A., Fitriani, & Sifriyani. (2021). Determining the noetherian property of generalized power series modules by using X-sub-exact sequence. J. Phys.: Conf. Ser. 1751 012028.

Fitriani, Surodjo, B., & Wijayanti, I. E. (2016). On sub-exact sequences. Far East Journal of Mathematical Sciences, 100(7), 1055–1065.

Fitriani, Surodjo, B., & Wijayanti, I. E. (2017). On X-sub-linearly independent modules. Journal of Physics: Conference Series, 893(1). https://doi.org/10.1088/1742-6596/893/1/012008

Fitriani, Wijayanti, I. E., & Surodjo, B. (2018a). A generalization of basis and free modules relatives to a family of R-modules. Journal of Physics: Conference Series, 1097(1). https://doi.org/10.1088/1742-6596/1097/1/012087

Fitriani, Wijayanti, I. E., & Surodjo, B. (2018b). Generalization of U-generator and M-subgenerator related to category σ[M]. Journal of Mathematics Research, 10(4), 101–106.

Han, S. (2001). The homomorphism and isomorphism of rough groups. Academy of Shanxi University, 24, 303–305.

Isaac, P., & Paul, U. (2017). Rough G-modules and their properties. Advances in Fuzzy Mathematics, 12(1), 93–100.

Jesmalar, L. (2017). Homomorphism and isomorphism of rough group. International Journal of Advance Research, Ideas and Innovations in Technology., 3(X), 1382–1387.

Kuroki, N. (1997). Rough ideals in semigroups. Inform. Sci., 100, 139–163.

Miao, D., Han, S., Li, D., & Sun, L. (2005). Rough group, rough subgroup and their properties. In Lecture Notes in Artificial Intelligence, 3641 (pp. 104–113).

Pawlak, Z. (1991). Rough sets-theoretical aspects of reasoning about data. Dordrecht, Kluwer.

Sinha, & Prakash. (2016). Rough exact sequences of modules. International Journal of Applied Engineering Research.