English

On graph norms for complex-valued functions

Combinatorics 2022-09-07 v2 Functional Analysis

Abstract

For any given graph HH, one may define a natural corresponding functional .H\|.\|_H for real-valued functions by using homomorphism density. One may also extend this to complex-valued functions, once HH is paired with a 22-edge-colouring α\alpha to assign conjugates. We say that HH is real-norming (resp. complex-norming) if .H\|.\|_H (resp. .H,α\|.\|_{H,\alpha} for some α\alpha) is a norm on the vector space of real-valued (resp. complex-valued) functions. These generalise the Gowers octahedral norms, a widely used tool in extremal combinatorics to quantify quasirandomness. We unify these two seemingly different notions of graph norms in real- and complex-valued settings. Namely, we prove that HH is complex-norming if and only if it is real-norming and simply call the property norming. Our proof does not explicitly construct a suitable 22-edge-colouring α\alpha but obtains its existence and uniqueness, which may be of independent interest. As an application, we give various example graphs that are not norming. In particular, we show that hypercubes are not norming, which resolves the last outstanding problem posed in Hatami's pioneering work on graph norms.

Keywords

Cite

@article{arxiv.2101.12145,
  title  = {On graph norms for complex-valued functions},
  author = {Joonkyung Lee and Alexander Sidorenko},
  journal= {arXiv preprint arXiv:2101.12145},
  year   = {2022}
}

Comments

33 pages

R2 v1 2026-06-23T22:37:48.028Z