A spectral threshold for triangle counting

Abstract

The 1970 spectral extension of Mantel's theorem, proved by Nosal, states that every graph with m edges and spectral radius ρ1>m contains at least one triangle. Its quantitative refinement by Ning and Zhai later established that any graph G with m edges and spectral radius ρ1≥m contains at least m-12 triangles, unless G is a complete bipartite graph. In this paper, we further investigate the minimum number of triangles guaranteed under the strengthened spectral condition ρ1≥m+c, where c is a positive constant. We prove that for any constant c∈ (0,12] and all sufficiently large m, if s=s(m) is a real-valued function satisfying m∞ sm=c, then every m-edge graph G with spectral radius ρ1 satisfying ρ12≥ m-1+2sρ1-1 contains at least s triangles. Moreover, we characterize the extremal graph achieving the minimal number of triangles. In particular, when s=m-12, our result settles a conjecture proposed by Li, Feng, and Peng.