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main.tex
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main.tex
@@ -169,8 +169,8 @@ Then we have
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For general matroids, we want to show the following.
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For general matroids, we want to show the following.
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\begin{conjecture}
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\begin{conjecture}\label{conj:dist}
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Let $M'$ be the contraction $M/F^*$. The rank of $M'$ is $k$.
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Let $M'$ be the contraction minor $M/F^*$. The rank of $M'$ is $k$.
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Given a positive integer $k'<k$, then there exists a distribution on $k'$-cocycles such that
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Given a positive integer $k'<k$, then there exists a distribution on $k'$-cocycles such that
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for any base $B$ of $M'$, the expected size of intersection is at most $O(k')$.
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for any base $B$ of $M'$, the expected size of intersection is at most $O(k')$.
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\end{conjecture}
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\end{conjecture}
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@@ -212,6 +212,10 @@ For a subset of rigid components $\mathcal P$, let $t=|\bigcup_{P\in \mathcal P}
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One can see that in this process we do not care the actual base $B_{F^*}$ and only the 1-thin cover matters.
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One can see that in this process we do not care the actual base $B_{F^*}$ and only the 1-thin cover matters.
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\end{remark}
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\end{remark}
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\begin{conjecture}
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\autoref{conj:dist} is true when $M$ is a 2D rigidity matroid.
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\end{conjecture}
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\section{Greedy base packing}
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\section{Greedy base packing}
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Reference in New Issue
Block a user