Characterization of Some Graphs Realizing Regularity Bounds for Binomial Edge Ideals

Abstract

In this paper, we characterize all graphs G satisfying \[reg(S/JG)=(G)=c(G)\] where (G) is the sum of the lengths of the longest induced paths in each connected component of G and c(G) is the number of the maximal cliques of G. We also characterize all connected graphs G that satisfy \[reg(S/JG)=(G)=|V(G)|-ω(G)+1\] where ω(G) is the clique number of G. Moreover, we investigate the possible values of the regularity of S/JG within the intervals [(G), c(G)] and [(G), |V(G)|-ω(G)+1].