VC-dimensions Between Partially Ordered Sets and Totally Ordered Sets
Abstract
We say that two partial orders on [n] are compatible if there exists a partial order that refines both of them. This compatibility relation induces a natural set system structure between the collection F of all partial orders and the collection G of all total orders on [n], where each order is associated with the set of orders compatible with it. In this note, we determine the VC-dimension of F with respect to G, proving that VCG(F) = n24 for n 4. We also establish bounds on the dual VC-dimension, showing that 2(n-3) VCF(G) n 2 n for all n 1.
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