The minimal Randić energy of trees with given diameter
作者:
Highlights:
• The Randić energy of a graph was introduced in discrete mathematical chemistry as an eigenvalues-based molecular descriptor.
• Let T(n,d;n1,n2,⋯,nd−1) be a caterpillar obtained from a path v0v1⋯vd by adding ni (ni≥0) pendent edges to vi (i=1,⋯,d−1).
• We prove that T(n,d;n−d−1,0,⋯,0) is the unique tree with minimal Randić energy among all trees of order n with diameter d.
摘要
•The Randić energy of a graph was introduced in discrete mathematical chemistry as an eigenvalues-based molecular descriptor.•Let T(n,d;n1,n2,⋯,nd−1) be a caterpillar obtained from a path v0v1⋯vd by adding ni (ni≥0) pendent edges to vi (i=1,⋯,d−1).•We prove that T(n,d;n−d−1,0,⋯,0) is the unique tree with minimal Randić energy among all trees of order n with diameter d.
论文关键词:Tree,Energy,Randić matrix,Randić energy
论文评审过程:Received 11 March 2021, Revised 29 June 2021, Accepted 30 June 2021, Available online 12 July 2021, Version of Record 12 July 2021.
论文官网地址:https://doi.org/10.1016/j.amc.2021.126489
