This work is licensed under the Creative Commons Attribution 4.0 International License.
R. P. Anstee. (1990), Simplified existence theorems for g, f )-factors, Discrete Appl. Math., 27, 29–38.AnsteeR. P.1990Simplified existence theorems for g, f )-factorsDiscrete Appl. Math2729–38Search in Google Scholar
S. Gong, M. K. Siddiquib, Y. Luo, and W. Gao. (2017), Feasibility analysis of data transmission in SDN, J. Intell. Fuzzy Syst., 33, 3145–3152.GongS.SiddiquibM. K.LuoY.GaoW.2017Feasibility analysis of data transmission in SDN, JIntell. Fuzzy Syst333145–3152Search in Google Scholar
M. Knor, R. Škrekovski and A. Tepeh. (2018), Convexity result and trees with large Balaban index, Appl. Math. Nonl. Sc., 3(2), 433–446.KnorM.ŠkrekovskiR.TepehA.2019Convexity result and trees with large Balaban indexAppl. Math. Nonl. Sc32433446Search in Google Scholar
D. L. Liu, C. X. Wang, and S. H. Wang. (2018), Hamilton-connectivity of interconnection networks modeled by a product of graphs, Appl. Math. Nonl. Sc., 3(2), 419–426.LiuD. L.WangC. X.WangS. H.2019Hamilton-connectivity of interconnection networks modeled by a product of graphsAppl. Math. Nonl. Sc32419426Search in Google Scholar
A. R. Virk and M. Quraish. (2018), Some invariants of flower graph, Appl. Math. Nonl. Sc., 3(2), 427–432.VirkA. R.QuraishM.2019Some invariants of flower graphAppl. Math. Nonl. Sc32427432Search in Google Scholar