TY - JOUR
ID - 10428
TI - The Reliability Wiener Number of Cartesian Product Graphs
JO - Iranian Journal of Mathematical Chemistry
JA - IJMC
LA - en
SN - 2228-6489
AU - Rupnik Poklukar, D.
AU - Zerovnik, J.
AD - University of Ljubljana
Y1 - 2015
PY - 2015
VL - 6
IS - 2
SP - 129
EP - 135
KW - Reliability
KW - Wiener number
KW - Wiener index
KW - Cartesian product of graphs
DO - 10.22052/ijmc.2015.10428
N2 - Reliability Wiener number is a modification of the original Wiener number in which probabilities are assigned to edges yielding a natural model in which there are some (or all) bonds in the molecule that are not static. Various probabilities naturally allow modelling different types of chemical bonds because chemical bonds are of different types and it is well-known that under certain conditions the bonds can break with certain probability. This is fully taken into account in quantum chemistry. In the model considered here, probabilistic nature is taken into account and at the same time the conceptual simplicity of the discrete graph theoretical model is preserved. Here we extend previous studies by deriving a formula for the reliability Wiener number of a Cartesian product of graphs.
UR - https://ijmc.kashanu.ac.ir/article_10428.html
L1 - https://ijmc.kashanu.ac.ir/article_10428_07180c1016b1b2b03841010eac54b78f.pdf
ER -