A Higher-Order Clique Density Theorem
Abstract
Reiher's clique density theorem determines the sharp lower envelope for the density of Kr at fixed edge density. We prove a higher-order version in which the prescribed quantity is itself a clique density. For every 3 s<r, we determine the minimum possible Kr-density among graphons with prescribed Ks-density. For s3 the constraint is genuinely nonlinear and leaves the edge density undetermined; nevertheless, on the positive range the sharp lower boundary is the classical multipartite edge-to-clique profile, reparametrised by Ks-density. We also prove stability on the positive branches of this profile: at every interior point, near extremality forces cut-distance closeness to the corresponding extremal family at the induced edge density.
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