On the Vertex-Degree-Function Indices of Connected (n,m)-Graphs of Maximum Degree at Most Four
Abstract
Consider a graph G and a real-valued function f defined on the degree set of G. The sum of the outputs f(dv) over all vertices v∈ V(G) of G is usually known as the vertex-degree-function indices and is denoted by Hf(G), where dv represents the degree of a vertex v of G. This paper gives sharp bounds on the index Hf(G) in terms of order and size of G when G is connected and has the maximum degree at most 4. All the graphs achieving the derived bounds are also determined. Bounds involving several existing indices - including the general zeroth-order Randi\'c index and coindex, the general multiplicative first/second Zagreb index, the variable sum lodeg index, and the variable sum exdeg index - are deduced as the special cases of the obtained ones.
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