Two remarks on graph norms

Abstract

For a graph H, its homomorphism density in graphs naturally extends to the space of two-variable symmetric functions W in Lp, p≥ e(H), denoted by t(H,W). One may then define corresponding functionals \|W\|H:=|t(H,W)|1/e(H) and \|W\|r(H):=t(H,|W|)1/e(H) and say that H is (semi-)norming if \|.\|H is a (semi-)norm and that H is weakly norming if \|.\|r(H) is a norm. We obtain two results that contribute to the theory of (weakly) norming graphs. Firstly, answering a question of Hatami, who estimated the modulus of convexity and smoothness of \|.\|H, we prove that \|.\|r(H) is not uniformly convex nor uniformly smooth, provided that H is weakly norming. Secondly, we prove that every graph H without isolated vertices is (weakly) norming if and only if each component is an isomorphic copy of a (weakly) norming graph. This strong factorisation result allows us to assume connectivity of H when studying graph norms. In particular, we correct an error in the original statement of the aforementioned theorem by Hatami.