On Weighted Monotone and Subadditive Graphs

Abstract

Let G(V,E) be a graph, and H:=\H:H⊂eq G\ denote the collection of all possible subgraphs of G. Then for each non-negative function w:H+, the graph G(V,E,w) is said to be a weighted graph. A weighted graph G(V,E,w) is called monotone (increasing), if for any H1,H2⊂eq G with H1⊂ H2, the following inequality holds: w(H1)≤ w(H2). On the other hand, a weighted graph G(V,E,w) is termed subadditive, if for any H1,H2⊂eq G, the following discrete functional inequality is satisfied: w(H1 H2)≤ w(H1)+ w(H2). Our main result demonstrates that for any graph G(V,E,w), it is possible to construct both the largest monotone and the greatest subadditive minorants. In other words, it is feasible to formulate the largest increasing function w:H+ and subadditive function w:H+ such that w(H)≤ w(H) and w(H)≤ w(H) hold respectively for all H⊂eq G .

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