Spectral Radius of Graphs with Size Constraints: Resolving a Conjecture of Guiduli
Abstract
We resolve a problem posed by Guiduli (1996) on the spectral radius of graphs satisfying the Hereditarily Bounded Property Pt,r, which requires that every subgraph H with |V(H)| ≥ t satisfies |E(H)| ≤ t|V(H)| + r. For an n-vertex graph G satisfying Pt,r, where t > 0 and r ≥ - t+1 2, we prove that the spectral radius (G) is bounded above by (G) ≤ c(s,t) + t n, where s = t + 12 + r, thus affirmatively answering Guiduli's conjecture. Furthermore, we present a complete characterization of the extremal graphs that achieve this bound. These graphs are constructed as the join graph K t ∇ F, where F is either K3 (n - t - 3)K1 or a forest consisting solely of star structures. The specific structure of such forests is meticulously characterized. Central to our analysis is the introduction of a novel potential function η(F) = e(F) + ( t - t)|V(F)|, which quantifies the structural "positivity" of subgraphs. By combining edge-shifting operations with spectral radius maximization principles, we establish sharp bounds on η+(G), the cumulative positivity of G. Our results contribute to the understanding of spectral extremal problems under edge-density constraints and provide a framework for analyzing similar hereditary properties.
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