Irregular subgraph in a regular graph

Abstract

A conjecture of Alon and Wei states that, for any d-regular graph G with n vertices, there exists a spanning subgraph H such that for all 0 i d, we have m(H, i), the number of vertices in H with degree i, is between nd+1-2 and nd+1+2. We prove the conjecture for all fixed d when n is sufficiently large. More precisely, if q=(q0,…,qd) satisfies Σi=0d qi=n, Σi=0d i qi 0 2, |qi-nd+1| 1 (0 i d), then there is a spanning subgraph H⊂eq G such that m(H,i)=qi (0 i d).

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