Annulus graphs in Rd
Abstract
A d-dimensional annulus graph with radii R1 and R2 (here R2 R1 0) is a graph embeddable in Rd so that two vertices u and v form an edge if and only if their images in the embedding are at distance in the interval [R1, R2]. In this paper we show that the family Ad(R1,R2) of d-dimensional annulus graphs with radii R1 and R2 is uniquely characterised by R2/R1 when this ratio is sufficiently large. Moreover, as a step towards a better understanding of the structure of Ad(R1,R2), we show that G∈ Ad(R1,R2) (G)/ω(G) is given by (O(d)) for all R1,R2 satisfying R2 R1 > 0 and also ((d)) if moreover R2/R1 1.2.
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