Another Proof of the Generalized Tutte--Berge Formula for f-Bounded Subgraphs
Abstract
Given a nonnegative integer weight f(v) for each vertex v in a multigraph G, an f-bounded subgraph of G is a multigraph H contained in G such that dH(v) f(v) for all v∈ V(G). Using Tutte's f-Factor Theorem, we give a new proof of the min-max relation for the maximum size of an f-bounded subgraph of G. When f(v)=1 for all v, the formula reduces to the classical Tutte--Berge Formula for the maximum size of a matching.
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