Duality between combinatorial Banach spaces holds precisely when the families are the finite cliques and anti-cliques of a perfect graph on the naturals, making Lovász' perfect graph theorem a corollary, with further study of the Sierpiński graph case.
MALIGRANDA,Orlicz spaces and interpolation, vol
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Geometric duality, perfect graphs, and the Sierpi\'nski space
Duality between combinatorial Banach spaces holds precisely when the families are the finite cliques and anti-cliques of a perfect graph on the naturals, making Lovász' perfect graph theorem a corollary, with further study of the Sierpiński graph case.