Bounds on Functionality and Symmetric Difference -- Two Intriguing Graph Parameters

Abstract

Functionality (fun) is a graph parameter that generalizes graph degeneracy defined by Alecu et al. [JCTB, 2021]. They research the relation of functionality to many other graphs parameters (tree-width, clique-width, VC-dimension, etc.). Extending their research, we completely characterize the functionality of random graph G(n,p) for all possible p. We provide matching (up to a constant factor) lower and upper bound for a large range of p. It follows from our bounds for G(n,p), that the maximum functionality (roughly n) is achieved for p ≈ 1/n. We complement this by showing that every graph G on n vertices have fun(G) O( n n) and we give a nearly matching (n)-lower bound provided by incident graphs of projective planes. Previously known lower bounds for functionality were only logarithmic in the number of vertices. Further, we study a related graph parameter symmetric difference (sd), the minimum of |N(u) ~~ N(v)| over all pairs of vertices of the ``worst possible'' induced subgraph. It was observed by Alecu et al. that fun(G) sd(G)+1 for every graph G. They asked whether the functionality of interval graphs is bounded. Recently, Dallard et al. [RiM, 2024] answered this positively and they constructed an interval graph G with sd(G) = ([4]n) (even though they did not mention the explicit bound), i.e., they separate the functionality and symmetric difference of interval graphs. We show that sd of interval graphs is at most O([3]n) and we provide a different example of an interval graph G with sd(G) = ([4]n). Further, we show that sd of circular arc graphs is (n).