Basic Chemical Graph Theory

Graph Theory applied in Chemistry is called Chemical Graph Theory. This interdisciplinary science takes problems (like isomer enumeration, structure elucidation, etc.) from Chemistry and solve them by Mathematics (using tools from Graph Theory, Set Theory or Combinatorics), thus influencing both Chemistry and Mathematics. This chapter introduces to basic definitions in Graph Theory: graph, walk, path, circuit, planar graph, graph invariant, vertex degree, chemical graph, etc. Then topological matrices are introduced: adjacency, distance, detour, combinatorial matrices, Wiener and Cluj matrices, walk matrix operator (combining three square matrices), reciprocal distance, and layer/shell matrices, on which the centrality indices are defined. Some info about topological symmetry is also presented.

This is a preview of subscription content, log in via an institution to check access.

Access this chapter

Subscribe and save

Springer+ Basic €32.70 /Month

Get 10 units per month
Download Article/Chapter or eBook
1 Unit = 1 Article or 1 Chapter
Cancel anytime

Buy Now

Price includes VAT (France)

eBook EUR 85.59 Price includes VAT (France)

Softcover Book EUR 105.49 Price includes VAT (France)

Hardcover Book EUR 105.49 Price includes VAT (France)

Tax calculation will be finalised at checkout

Purchases are for personal use only

References

Amić D, Trinajstić N (1995) On the detour matrix. Croat Chem Acta 68:53–62 Google Scholar
Balasubramanian K (1994) Computer generation of automorphism graphs of weighted graphs. J Chem Inf Comput Sci 34:1146–1150 ArticleCASGoogle Scholar
Balasubramanian K (1995a) Computer generation of nuclear equivalence classes based on the three-dimensional molecular structure. J Chem Inf Comput Sci 35:243–250 ArticleCASGoogle Scholar
Balasubramanian K (1995b) Computational strategies for the generation of equivalence classes of Hadamard matrices. J Chem Inf Comput Sci 35:581–589 ArticleCASGoogle Scholar
Balasubramanian K (1995c) Computer perception of molecular symmetry. J Chem Inf Comput Sci 35:761–770 ArticleCASGoogle Scholar
Bonchev D, Mekenyan O, Balaban AT (1989) Iterative procedure for the generalized graph center in polycyclic graphs. J Chem Inf Comput Sci 29:91–97 ArticleCASGoogle Scholar
Ciubotariu D (1987) Structură-reactivitate în clasa derivaţilor acidului carbonic. PhD Thesis, Timisoara, Romania Google Scholar
Ciubotariu D, Medeleanu M, Vlaia V, Olariu T, Ciubotariu C, Dragos D, Seiman C (2004) Molecular van der Waals space and topological indices from the distance matrix. Molecules 9:1053–1078 ArticleCASGoogle Scholar
Crippen GM (1977) A novel approach to calculation of conformation: distance geometry. J Comput Phys 24:96–107 ArticleCASGoogle Scholar
Diudea MV (1994) Layer matrices in molecular graphs. J Chem Inf Comput Sci 34:1064–1071 ArticleCASGoogle Scholar
Diudea MV (1996) Walk numbers e W_M: Wiener-type numbers of higher rank. J Chem Inf Comput Sci 36:535–540 ArticleCASGoogle Scholar
Diudea MV (1997a) Cluj matrix invariants. J Chem Inf Comput Sci 37:300–305 ArticleCASGoogle Scholar
Diudea MV (1997b) Cluj matrix, CJ_u: source of various graph descriptors. MATCH Commun Math Comput Chem 35:169–183 CASGoogle Scholar
Diudea MV (1997c) Indices of reciprocal property or Harary indices. J Chem Inf Comput Sci 37:292–299 ArticleCASGoogle Scholar
Diudea MV (1999) Valencies of property. Croat Chem Acta 72:835–851 CASGoogle Scholar
Diudea MV (2010) Nanomolecules and nanostructures—polynomials and indices, MCM, No. 10. University Kragujevac, Serbia Google Scholar
Diudea MV, Gutman I (1998) Wiener-type topological indices. Croat Chem Acta 71:21–51 CASGoogle Scholar
Diudea MV, Randić M (1997) Matrix operator, W_(M1,M2,M3) and Schultz-type numbers. J Chem Inf Comput Sci 37:1095–1100 ArticleCASGoogle Scholar
Diudea MV, Ursu O (2003) Layer matrices and distance property descriptors. Indian J Chem 42A:1283–1294 CASGoogle Scholar
Diudea MV, Topan MI, Graovac A (1994) Layer matrices of walk degrees. J Chem Inf Comput Sci 34:1071–1078 Google Scholar
Diudea MV, Parv B, Gutman I (1997a) Detour-Cluj matrix and derived invariants. J Chem Inf Comput Sci 37:1101–1108 ArticleCASGoogle Scholar
Diudea M, Parv B, Topan MI (1997b) Derived Szeged and Cluj indices. J Serb Chem Soc 62:267–276 CASGoogle Scholar
Diudea MV, Katona G, Lukovits I, Trinajstić N (1998) Detour and Cluj-detour indices. Croat Chem Acta 71:459–471 CASGoogle Scholar
Diudea MV, Gutman I, Jäntschi L (2002) Molecular topology. NOVA, New York Google Scholar
Diudea MV, Florescu MS, Khadikar PV (2006) Molecular topology and its applications. EFICON, Bucharest Google Scholar
Dobrynin AA (1993) Degeneracy of some matrix invariant and derived topological indices. J Math Chem 14:175–184 ArticleGoogle Scholar
Dobrynin AA, Kochetova AA (1994) Degree distance of a graph: a degree analogue of the Wiener index. J Chem Inf Comput Sci 34:1082–1086 ArticleCASGoogle Scholar
Estrada E, Rodriguez L (1997) Matrix algebric manipulation of molecular graphs, Harary- and MTI-like molecular descriptors. MATCH Commun Math Comput Chem 35:157–167 CASGoogle Scholar
Estrada E, Rodriguez L, Gutierrez A (1997) Matrix algebric manipulation of molecular graphs, distance and vertex-adjacency matrices. MATCH Commun Math Chem 35:145–156 CASGoogle Scholar
Euler L (1752–1753) Elementa doctrinae solidorum. Novi Comm Acad Scient Imp Petrop 4:109–160 Google Scholar
Graovac A, Babić D (1990) The evaluation of quantum chemical indices by the method of moments. Int J Quantum Chem Quantum Chem Symp 24:251–262 ArticleCASGoogle Scholar
Gutman I (1994) A formula for the Wiener number of trees and its extension to graphs containing cycles. Graph Theory Notes NY 27:9–15 Google Scholar
Gutman I, Polansky OE (1986) Mathematical concepts in organic chemistry. Springer, Berlin, pp 108–116 BookGoogle Scholar
Halberstam FY, Quintas LV (1982) Distance and path degree sequences for cubic graphs. Pace University, New York. A note on table of distance and path degree sequences for cubic graphs, Pace University, New York Google Scholar
Harary F (1969) Graph theory. Addison-Wesley, Reading BookGoogle Scholar
Hargittai M, Hargittai I (2010) Symmetry through the eyes of a chemist. Springer, Dordrecht Google Scholar
Horn RA, Johnson CR (1985) Matrix analysis. Cambridge University Press, Cambridge BookGoogle Scholar
Hungerford TW (1974) Algebra. Graduate texts in mathematics, vol 73. Springer, New York (Reprint of the original 1980) Google Scholar
Ionescu T (1973) Graphs-applications (in Romanian), Ed. Ped., Bucharest Google Scholar
Ivanciuc O, Balaban TS, Balaban AT (1993) Reciprocal distance matrix, related local vertex invariants and topological indices. J Math Chem 12:309–318 ArticleCASGoogle Scholar
Janežič D, Miličević A, Nikolić S, Trinajstić N (2007) Graph theoretical matrices in chemistry. Mathematical chemistry monographs. University Kragujevac, Kragujevac Google Scholar
Klein DJ, Lukovits I, Gutman I (1995) On the definition of the hyper-Wiener index for cycle-containing structures. J Chem Inf Comput Sci 35:50–52 ArticleCASGoogle Scholar
Kuratowski K (1930) Sur le Problème des Courbes Gauches en Topologie. Fund Math 15:271–283 ArticleGoogle Scholar
Lukovits I (1996) The detour index. Croat Chem Acta 69:873–882 CASGoogle Scholar
Mirman R (1999) Point groups, space groups, crystals, molecules. World Scientific, River Edge BookGoogle Scholar
Petitjean M (2007) A definition of symmetry. Symmetry Cult Sci 18:99–119 Google Scholar
Plavšić D, Nikolić S, Trinajstić N, Mihalić Z (1993) On the Harary index for the characterization of chemical graphs. J Math Chem 12:235–250 ArticleGoogle Scholar
Randić M (1991) Generalized molecular descriptors. J Math Chem 7:155–168 ArticleGoogle Scholar
Randić M (1993) Novel molecular description for structure-property studies. Chem Phys Lett 211:478–483 ArticleGoogle Scholar
Randić M (1995) Restricted random walks on graphs. Theor Chim Acta 92:97–106 ArticleGoogle Scholar
Randić M, Guo X, Oxley T, Krishnapriyan H (1993) Wiener matrix: source of novel graph invariants. J Chem Inf Comput Sci 33:700–716 Google Scholar
Randić M, Guo X, Oxley T, Krishnapriyan H, Naylor L (1994) Wiener matrix invariants. J Chem Inf Comput Sci 34:361–367 ArticleGoogle Scholar
Razinger M, Balasubramanian K, Munk ME (1993) Graph automorphism perception algorithms in computer-enhanced structure elucidation. J Chem Inf Comput Sci 33:197–201 ArticleCASGoogle Scholar
Skorobogatov AV, Dobrynin AA (1988) Metric analysis of graphs. MATCH Commun Math Comput Chem 23:105–151 CASGoogle Scholar
Sylvester JJ (1874) On an application of the new atomic theory to the graphical representation of the invariants and covariants of binary quantics—with three appendices. Am J Math 1:64–90 ArticleGoogle Scholar
Tratch SS, Stankevich MI, Zefirov NS (1990) Combinatorial models and algorithms in chemistry. The expanded Wiener number—a novel topological index. J Comput Chem 11:899–908 ArticleCASGoogle Scholar
Trinajstić N (1983) Chemical graph theory. CRC Press, Boca Raton Google Scholar
Ursu O, Diudea MV (2005) TOPOCLUJ software program. Babes-Bolyai University, Cluj Google Scholar
Wiener H (1947) Structural determination of paraffin boiling points. J Am Chem Soc 69:17–20 ArticleCASGoogle Scholar

Author information

Authors and Affiliations

Department of Chemistry, Faculty of Chemistry and Chemical Engineering, Babes-Bolyai University, Cluj-Napoca, Romania Mircea Vasile Diudea

Mircea Vasile Diudea

You can also search for this author in PubMed Google Scholar

Rights and permissions

Copyright information

About this chapter

Cite this chapter

Diudea, M.V. (2018). Basic Chemical Graph Theory. In: Multi-shell Polyhedral Clusters. Carbon Materials: Chemistry and Physics, vol 10. Springer, Cham. https://doi.org/10.1007/978-3-319-64123-2_1

Download citation

.RIS
.ENW
.BIB

DOI : https://doi.org/10.1007/978-3-319-64123-2_1
Published : 21 October 2017
Publisher Name : Springer, Cham
Print ISBN : 978-3-319-64121-8
Online ISBN : 978-3-319-64123-2
eBook Packages : Chemistry and Materials ScienceChemistry and Material Science (R0)

Share this chapter

Anyone you share the following link with will be able to read this content:

Get shareable link

Sorry, a shareable link is not currently available for this article.

Copy to clipboard

Provided by the Springer Nature SharedIt content-sharing initiative