Nearly-uniform degree distributions in spanning subgraphs
Abstract
We show that, when d=o(n), every d-regular n-vertex graph contains a spanning subgraph whose degree distribution is nearly uniform, i.e., for each 0≤ i≤ d, there are (1+o(1))n/(d+1) vertices with degree i. This proves a conjecture of Alon and Wei on irregular subgraphs and strengthens a previous result of Fox, Luo and Pham.
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