Proof of Nash-Williams' Intersection Conjecture for countable matroids
Abstract
We prove that if M and N are finitary matroids on a common countable edge set E then they admit a common independent set I such that there is a bipartition E=EM EN for which I EM spans EM in M and I EN spans EN in N . It answers positively the Matroid Intersection Conjecture of Nash-Williams in the countable case.
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