The Bollob\'as--Nikiforov Conjecture for Complete Multipartite Graphs and Dense K4-Free Graphs
Abstract
The Bollob\'as--Nikiforov conjecture asserts that for any graph G ≠ Kn with m edges and clique number ω(G), \[ λ12(G) + λ22(G) \;≤\; 2\!(1 - 1ω(G))m, \] where λ1(G) ≥ λ2(G) ≥ ·s ≥ λn(G) are the adjacency eigenvalues of G. We prove the conjecture for all complete multipartite graphs Kn1,…,nr with n1 + ·s + nr > r. The proof computes the full spectrum via a secular equation, establishes that λ2 = 0 whenever the graph has more vertices than parts, and then applies Nikiforov's spectral Tur\'an theorem; equality holds if and only if all parts have equal size. We also prove a stability result for K4-free graphs whose spectral radius is near the Tur\'an maximum: such graphs are structurally close to the balanced complete tripartite graph, and as a consequence the conjecture holds for all K4-free graphs with m = (n2) when n is sufficiently large. Finally, we identify the precise obstruction preventing a Hoffman-bound approach from settling the conjecture for K4-free graphs with independence number α(G) ≥ n/3.
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