This work is licensed under the Creative Commons Attribution 4.0 International License.
Abdoa, H.; Dimitrovb, D.; Gutman, I.; On extremal trees with respect to the F-index. Kuwait J. Sci.2017, 44(3) 1–8.AbdoaH.DimitrovbD.GutmanI.On extremal trees with respect to the F-indexKuwait J. Sci.201744318Search in Google Scholar
Alonso, L.; Cerf, R.; The three dimensional polyominoes of minimal area. Electron. J. Combin.1996, 3(1), 22–32.AlonsoL.CerfR.The three dimensional polyominoes of minimal areaElectron. J. Combin.199631223210.37236/1251Search in Google Scholar
An, M.; Xiong, L.; Extremal polyomino chains with respect to general Randic index. Journal of Combinatorial Optimization, 2016, 31(2), 635–647.AnM.XiongL.Extremal polyomino chains with respect to general Randic indexJournal of Combinatorial Optimization201631263564710.1007/s10878-014-9781-6Search in Google Scholar
B. Assayeberhann, M. Alamnehmih, L. N. Mishrala, and Y. Mebrat, Dual skew Heyting almost distributive lattices, Applied Mathematics and Nonlinear Sciences, 4(1), (2019) 151–162.AssayeberhannB.AlamnehmihM.MishralaL. N.MebratY.Dual skew Heyting almost distributive latticesApplied Mathematics and Nonlinear Sciences41201915116210.2478/AMNS.2019.1.00015Search in Google Scholar
S. M. Hosamani, B, B. Kulkarni, R. G. Boli, V. M. Gadag, QSPR Analysis of Certain Graph Theocratical Matrices and Their Corresponding Energy, Applied Mathematics and Nonlinear Sciences 2(1) (2017) 131–150.HosamaniS. M.KulkarniB, B.BoliR. G.GadagV. M.QSPR Analysis of Certain Graph Theocratical Matrices and Their Corresponding EnergyApplied Mathematics and Nonlinear Sciences21201713115010.21042/AMNS.2017.1.00011Search in Google Scholar
S. Aidara, Y. Sagna, BSDEs driven by two mutually independent fractional Brownian motions with stochastic Lipschitz coescients, Applied Mathematics and Nonlinear Sciences, 4(1), (2019), 139–150.AidaraS.SagnaY.BSDEs driven by two mutually independent fractional Brownian motions with stochastic Lipschitz coescientsApplied Mathematics and Nonlinear Sciences41201913915010.2478/AMNS.2019.1.00014Search in Google Scholar
Shao, Z.; Siddiqui, M.K.; Muhammad, M.H.; Computing zagreb indices and zagreb polynomials for symmetrical nanotubes, Symmetry, 2018, 10 (7), 244–254.ShaoZ.SiddiquiM.K.MuhammadM.H.Computing zagreb indices and zagreb polynomials for symmetrical nanotubesSymmetry201810724425410.3390/sym10070244Search in Google Scholar
Jia-Bao Liu, Chunxiang Wang, Shaohui Wang, Bing Wei, Zagreb Indices and Multiplicative Zagreb Indices of Eulerian Graphs, Bulletin of the Malaysian Mathematical Sciences Society, 42 (2019):67–78.LiuJia-BaoWangChunxiangWangShaohuiWeiBingZagreb Indices and Multiplicative Zagreb Indices of Eulerian GraphsBulletin of the Malaysian Mathematical Sciences Society422019677810.1007/s40840-017-0463-2Search in Google Scholar
Jia-Bao Liu, J. Zhao, Z. X. Zhu, On the number of spanning trees and normalized Laplacian of linear octagonal quadrilateral networks, International Journal of Quantum Chemistry, 119 (2019), 25–71.LiuJia-BaoZhaoJ.ZhuZ. X.On the number of spanning trees and normalized Laplacian of linear octagonal quadrilateral networksInternational Journal of Quantum Chemistry1192019257110.1002/qua.25971Search in Google Scholar
Jia-Bao Liu, J. Zhao, J. Min, J. D. Cao, On the Hosoya index of graphs formed by a fractal graph, Fractals-Complex Geometry Patterns and Scaling in Nature and Society, 27(8)(2019) 195–205.LiuJia-BaoZhaoJ.MinJ.CaoJ. D.On the Hosoya index of graphs formed by a fractal graphFractals-Complex Geometry Patterns and Scaling in Nature and Society278201919520510.1142/S0218348X19501354Search in Google Scholar
Borissevicha, K.; Došlić, T.; Counting dominating sets in cactus chains. Faculty of Sciences and Mathematics, University of Niš, Serbia. 2015, 29(8), 1847–1855.BorissevichaK.DošlićT.Counting dominating sets in cactus chains. Faculty of Sciences and MathematicsUniversity of Niš, Serbia201529818471855Search in Google Scholar
De, N.; Nayeem, S. M. A.; Pal, A.; F-index of some graph operations. Discrete Mathematics Algorithms and Applications, 2016, 8(02), 165–175.DeN.NayeemS. M. A.PalA.F-index of some graph operationsDiscrete Mathematics Algorithms and Applications201680216517510.1142/S1793830916500257Search in Google Scholar
Furtula, B.; Gutman I.; A forgotten topological index, J. Math. Chem.2015, 53, 1184–1190.FurtulaB.GutmanI.A forgotten topological indexJ. Math. Chem.2015531184119010.1007/s10910-015-0480-zSearch in Google Scholar
Gutman, I.; Trinajstić, N.; Graph theory and molecular orbitals. Total π-electron energy of alternant hydrocarbons. Chem. Phys. Lett.1972, 17, 535–538.GutmanI.TrinajstićN.Graph theory and molecular orbitals. Total π-electron energy of alternant hydrocarbonsChem. Phys. Lett.19721753553810.1016/0009-2614(72)85099-1Search in Google Scholar
Gutman, I.; Furtula, B; Recent results in the theory of Randic index. University, Faculty of Science. (Eds. 2), ISBN: 978-86-81829-87-5, 2008.GutmanI.FurtulaBRecent results in the theory of Randic indexUniversity, Faculty of Science(Eds. 2), ISBN: 978-86-81829-87-5,2008Search in Google Scholar
Gutman, I.; Das, K. C.; The first Zagreb index 30 years after. MATCH Commun. Math. Comput. Chem.2004, 50, 83–92.GutmanI.DasK. C.The first Zagreb index 30 years afterMATCH Commun. Math. Comput. Chem.2004508392Search in Google Scholar
Golomb, S. W.; Checker boards and polyominoes. The American Mathematical Monthly,1954, 61(10), 675–682.GolombS. W.Checker boards and polyominoesThe American Mathematical Monthly1954611067568210.1080/00029890.1954.11988548Search in Google Scholar
Husimi, K.; Note on Mayers’ theory of cluster integrals. The Journal of Chemical Physics, 1950, 18(5), 682–684.HusimiK.Note on Mayers’ theory of cluster integralsThe Journal of Chemical Physics195018568268410.1063/1.1747725Search in Google Scholar
Hosamani, S. M.; A upper bound for the F1-index and its applications to fullerenes. MATCH Commun. Math. Comput. Chem.2015, 74(1), 97–101.HosamaniS. M.A upper bound for the F1-index and its applications to fullerenesMATCH Commun. Math. Comput. Chem.201574197101Search in Google Scholar
Khadikar, P. V.; Kale, P. P.; Deshpande, N. V.; Karmarkar, S.; Agrawal, V. K.; Novel PI indices of hexagonal chains. Journal of Mathematical Chemistry,2001, 29(2), 143–150.KhadikarP. V.KaleP. P.DeshpandeN. V.KarmarkarS.AgrawalV. K.Novel PI indices of hexagonal chainsJournal of Mathematical Chemistry200129214315010.1023/A:1010931213729Search in Google Scholar
Klarner, D. A.; Polyominoes, in:Goodman, J. E., O’Rourke, J. (Eds.)., Handbook of Discrete and Computational Geometry. CRC Press LLC. 225–242, 1997.KlarnerD. A.Polyominoesin:GoodmanJ. E.O’RourkeJ.(Eds.).Handbook of Discrete and Computational GeometryCRC Press LLC2252421997Search in Google Scholar
Li, X.; Zheng, J.; A unified approach to the extremal trees for different indices. MATCH Commun. Math. Comput. Chem.2005, 54(1), 195–208.LiX.ZhengJ.A unified approach to the extremal trees for different indicesMATCH Commun. Math. Comput. Chem.2005541195208Search in Google Scholar
Li, X.; Yang, X.; Wang, G.; Hu, R.; Hosoya polynomials of general spiro hexagonal chains. Filomat, 2014, 28(1), 211–215.LiX.YangX.WangG.HuR.Hosoya polynomials of general spiro hexagonal chainsFilomat201428121121510.2298/FIL1401211LSearch in Google Scholar
Majstorovic, S.; Doslic, T.; Klobucar, A.; k–domination on hexagonal cactus chains. Kragujevac journal of Mathematics, 2012, 36(2), 335–347.MajstorovicS.DoslicT.KlobucarA.k–domination on hexagonal cactus chainsKragujevac journal of Mathematics2012362335347Search in Google Scholar
Randić, M.; On characterization of molecular branching. J. Am. Chem. Soc., 1975, 97, 6609–6615.RandićM.On characterization of molecular branchingJ. Am. Chem. Soc.1975976609661510.1021/ja00856a001Search in Google Scholar
Riddell Jr, R. J.; Contributions to the Theory of Condensation. Ph.D. thesis, Univ. of Michigan, Ann Arbor, 1951.RiddellR. J.JrContributions to the Theory of CondensationPh.D. thesis,Univ. of MichiganAnn Arbor1951Search in Google Scholar
Xu, L.; Chen, S.; The PI Index of polyomino chains. Appl. Math. Lett.2008, 21(11), 1101–1104.XuL.ChenS.The PI Index of polyomino chainsAppl. Math. Lett.200821111101110410.1016/j.aml.2007.12.007Search in Google Scholar
Yang, J.; Xia, F.; Chen, S.; On the Randić index of of polyomino chains. Appl. Math. Sci.2011, 5, 255–260.YangJ.XiaF.ChenS.On the Randić index of of polyomino chainsAppl. Math. Sci.20115255260Search in Google Scholar
Yang, J.; Xia, F.; Chen, S.; On sum-connectivity index of polyomino chains. Appl. Math. Sci.2011, 5, 267–271.YangJ.XiaF.ChenS.On sum-connectivity index of polyomino chainsAppl. Math. Sci.20115267271Search in Google Scholar
Yarahmaadi, Z.; Došlić, T.; Moradi, S.; chain hexagonal cacti: extremal with respect to the eccentric connectivity index. Ira. J. Math. Chem.2013, 4, 123–136.YarahmaadiZ.DošlićT.MoradiS.chain hexagonal cacti: extremal with respect to the eccentric connectivity indexIra. J. Math. Chem.20134123136Search in Google Scholar
Yarahmadia, Z.; Ashrafi, A. R.; Moradi, S.; Extremal polyomino chains with respect to Zagreb indices. Appl. Math. Lett.2012, 25, 166–171.YarahmadiaZ.AshrafiA. R.MoradiS.Extremal polyomino chains with respect to Zagreb indicesAppl. Math. Lett.20122516617110.1016/j.aml.2011.08.008Search in Google Scholar
Wiener, H. J.; Structural determination of parafn boiling points, Journal of the American Chemical Society, 1947, 69(1), 17–20.WienerH. J.Structural determination of parafn boiling pointsJournal of the American Chemical Society1947691172010.1021/ja01193a00520291038Search in Google Scholar
Zhou, B.; Zagreb indices. MATCH Commun. Math. Comput. Chem.2004, 52, 113–118.ZhouB.Zagreb indicesMATCH Commun. Math. Comput. Chem.200452113118Search in Google Scholar