Measurable Regular Subgraphs
Abstract
We show that every d-regular bipartite Borel graph admits a Baire measurable k-regular spanning subgraph if and only if d is odd or k is even. This gives the first example of a locally checkable coloring problem which is known to have a Baire measurable solution on Borel graphs but not a computable solution on highly computable graphs. We also prove the analogous result in the measure setting for hyperfinite graphs.
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