On graph norms for complex-valued functions

Abstract: For any given graph H, one may define a natural corresponding functional . H for realvalued functions by using homomorphism density. One may also extend this to complex-valued functions, once H is paired with a 2-edge-colouring α to assign conjugates. We say that H is real-norming (resp. complex-norming) if . H (resp. . H,α for some α) 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 quan… Show more