An acyclic edge coloring of a graph is a proper edge coloring such that there are no bichromatic cycles. The acyclic chromatic index of a graph $G$ denoted by $chi_a '(G)$ is the minimum number $k$ such that there is an acyclic edge coloring using $k$ colors. The maximum degree in $G$ denoted by $Delta(G)$, is the lower bound for $chi_a '(G)$. $P$-cuts introduced in this paper acts as a powerful tool to prove that this bound is sharp for certain chemical structures.
Rajasingh, I., Rajan, R., & Paul, D. (2015). A New Approach to Compute Acyclic Chromatic Index of Certain Chemical Structures. Iranian Journal of Mathematical Chemistry, 6(1), 51-61. doi: 10.22052/ijmc.2015.9056
MLA
I. Rajasingh; R. Rajan; D. Paul. "A New Approach to Compute Acyclic Chromatic Index of Certain Chemical Structures", Iranian Journal of Mathematical Chemistry, 6, 1, 2015, 51-61. doi: 10.22052/ijmc.2015.9056
HARVARD
Rajasingh, I., Rajan, R., Paul, D. (2015). 'A New Approach to Compute Acyclic Chromatic Index of Certain Chemical Structures', Iranian Journal of Mathematical Chemistry, 6(1), pp. 51-61. doi: 10.22052/ijmc.2015.9056
VANCOUVER
Rajasingh, I., Rajan, R., Paul, D. A New Approach to Compute Acyclic Chromatic Index of Certain Chemical Structures. Iranian Journal of Mathematical Chemistry, 2015; 6(1): 51-61. doi: 10.22052/ijmc.2015.9056