A Generalized Cheeger Inequality

Abstract

The generalized conductance φ(G,H) between two graphs G and H on the same vertex set V is defined as the ratio φ(G,H) = S⊂eq V capG(S,S) capH(S,S), where capG(S,S) is the total weight of the edges crossing from S to S=V-S. We show that the minimum generalized eigenvalue λ(LG,LH) of the pair of Laplacians LG and LH satisfies λ(LG,LH) ≥ φ(G,H) φ(G)/8, where φ(G) is the usual conductance of G. A generalized cut that meets this bound can be obtained from the generalized eigenvector corresponding to λ(LG,LH). The inequality complements a recent proof that φ(G) cannot be replaced by (φ(G,H)) in the above inequality, unless the Unique Games Conjecture is false.