Fibonacenes (zig-zag unbranched catacondensed benzenoid hydrocarbons) are a class of polycyclic conjugated systems whose molecular graphs possess remarkable properties, often related with the Fibonacci numbers. This article is a review of the chemical graph theory of fibonacenes, with emphasis on their Kekule-structure-related and Clar-structure-related properties
Graph Theory is a branch of mathematics that has a wealth of applications to other science and engin...
Chemical graph theory is a branch of mathematical chemistry which applies graph theory in mathematic...
Graph theory plays a vital role in modeling and designing any chemical structure or chemical network...
Fo·r benze.notd or non-benzenoid ca:ta1fusenes having a non- ibranched string 01f cata-co.ndensed ri...
AbstractA Clar structure is defined to be a maximal indepenent set of vertices of the Clar graph of ...
In recent years conjugated molecules have been intensely studied by means of graph theory1 and a num...
AbstractThis paper provides a combinatorial characterization for the class of graphs that model mole...
In Medical Science, the methods of topological descriptor computation can help to obtain the availab...
The field of chemical graph theory utilizes simple graphs as models of molecules. These models are c...
The Fibonacci number f (G) of a graph G = (V;E) is defined as the number of all subsets U of V such ...
Series of strongly subspectral molecular graphs (having a preponderance of common eigenvalues) corre...
Atoms displayed as vertices and bonds can be shown by edges on a molecular graph. For such graphs we...
The development of chemical applications of graph theory is reviewed from a personal perspective. Gr...
Kekule structures are transformed into the subspace of their double bonds to yield the correspondiln...
The graph spectral theory of conjugated molecules is presented. It is shown that the number of bondi...
Graph Theory is a branch of mathematics that has a wealth of applications to other science and engin...
Chemical graph theory is a branch of mathematical chemistry which applies graph theory in mathematic...
Graph theory plays a vital role in modeling and designing any chemical structure or chemical network...
Fo·r benze.notd or non-benzenoid ca:ta1fusenes having a non- ibranched string 01f cata-co.ndensed ri...
AbstractA Clar structure is defined to be a maximal indepenent set of vertices of the Clar graph of ...
In recent years conjugated molecules have been intensely studied by means of graph theory1 and a num...
AbstractThis paper provides a combinatorial characterization for the class of graphs that model mole...
In Medical Science, the methods of topological descriptor computation can help to obtain the availab...
The field of chemical graph theory utilizes simple graphs as models of molecules. These models are c...
The Fibonacci number f (G) of a graph G = (V;E) is defined as the number of all subsets U of V such ...
Series of strongly subspectral molecular graphs (having a preponderance of common eigenvalues) corre...
Atoms displayed as vertices and bonds can be shown by edges on a molecular graph. For such graphs we...
The development of chemical applications of graph theory is reviewed from a personal perspective. Gr...
Kekule structures are transformed into the subspace of their double bonds to yield the correspondiln...
The graph spectral theory of conjugated molecules is presented. It is shown that the number of bondi...
Graph Theory is a branch of mathematics that has a wealth of applications to other science and engin...
Chemical graph theory is a branch of mathematical chemistry which applies graph theory in mathematic...
Graph theory plays a vital role in modeling and designing any chemical structure or chemical network...