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Kim--Vu's sandwich conjecture is true for $d \gg \log^4 n$

Published 18 Nov 2020 in math.CO | (2011.09449v5)

Abstract: Kim and Vu made the following conjecture (\textit{Advances in Mathematics}, 2004): if $d\gg \log n$, then the random $d$-regular graph $G(n,d)$ can be ``sandwiched'' between $G(n,p_)$ and $G(n,p^)$ where $p_$ and $p^$ are both asymptotically equal to $d/n$. This famous conjecture was previously proved for all $d\gg (n\log n){3/4}$. In this paper, we confirm the conjecture when $d \gg \log4 n$. We also extend this result to near-regular degree sequences.

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