p improving estimates for multilinear forms motivated by distance graphs

Abstract

We undertake a systematic study of the mapping properties of forms based on distance graphs in Zd to see how the structure of a graph, G, affects the p improving estimates of the form, ΛG, based on G. This extends previous work on p improving properties for the spherical averaging operator, which corresponds to a distance graph of a single distance. We obtain p improving estimates for the collection of forms based on all graphs with 2, 3, and 4 vertices, as well as chains and simplexes of any size in Zd. Surprisingly, certain mapping properties only seem to depend on the number of vertices in the graph, not its structure, and forms based on subgraphs of a graph, G, do not necessarily inherit all mapping properties from G.