Super Edge-Magic Sequences of Graphs and Applications

In this book we introduce a new concept of Super Edge-Magic Sequence (SEMS) of a Super Edge-Magic Graph (SEMG) with p vertices and q edges and its properties . We generate the special super edge-magic sequences on (q+1 q) and (q q) graphs which are unicyclic graphs and trees. We project above SEMS in a significant direction which can give scope to frame applications of engineering like in Computer Science and in Chemistry. We design a method to calculate Wiener Index of Graph (molecular graph) and also through this sequence we compute their intrinsic properties (like number of Atoms bonds cyclomatic number chemical formula and nature of the compound is either chain or cycle) of some family of chemical compounds. We establish the concepts especially towards striped Maximal Outer Planar (MOP) graph .According to this we first frame one algorithm for striped MOP.Then we derive a theorem that yields formula for total number of super edge-magic graphs. Finally we analyze graphical properties like Independence Number Chromatic Number Dominance Number and Matching Number which are useful for Computer Science Applications.We calculate all the above by the concept of bond matrix.