Component Descriptions (SAC-01 Documentation) SAC-01 - Topological Persistence Diagram Assembly - Resolution of the Erdős-Sós Conjecture via Graphon Stability This document provides the high-dimensional topological characterization of the resolution. Utilizing persistent homology and superlevel set filtrations of the limit graphon W, it maps the birth and persistence of connected components corresponding to the tree topology Tₖ. The assembly demonstrates that under the prescribed density constraints, the homological features of the tree exhibit infinite persistence, proving that tree embeddings are a topological necessity of the dense limit. Resolution of the Erdős-Sós Conjecture via Graphon Stability - SAC-01 - Standard Academic Core Record - erdosₛosᵢntegratedᵣesolution. pdf This is the definitive analytical record of the resolution. It provides the formal proof that the Erdős-Sós Conjecture (1962) is a direct consequence of the Sidorenko-positivity of tree graphs within the graphon space W. By establishing that the homomorphism density functional t (Tₖ, W) is globally minimized by the quasirandom state Wₚ =, the record proves that any graph exceeding the average degree threshold k-2 must contain Tₖ as a subgraph. SAC-01 - Executive Summary - Resolution of the Erdős-Sós Conjecture via Graphon Stability A strategic synthesis of the mathematical resolution designed for peer review and academic oversight. It summarizes the transition from discrete extremal graph theory to continuous functional analysis, highlighting the proof’s reliance on the stability of the Sidorenko minimum and the contradiction of the "tree-free" extremal sequence. It serves as the primary orienting document for the complete SAC-01 technical suite. SAC-01 Appendix A - Numerical Verification of Homomorphism Densities - Resolution of the Erdős-Sós Conjecture via Graphon Stability A granular data appendix providing empirical validation of the analytic proof for specific tree families, including paths (Pₖ) and stars (Sₖ). Using Lᵖ norm analysis and Jensen's inequality, this document illustrates how structural variance in the degree distribution acts as a forcing function that strictly increases tree density above the quasirandom floor, thereby validating the conjecture in discrete regimes. SAC-01 - Formal Simulation Data Assembly - Resolution of the Erdős-Sós Conjecture via Graphon Stability The consolidated record of numerical simulations and Monte Carlo integrations performed across the graphon space. This assembly documents the convergence of discrete graph sequences to the limit object and verifies that the homomorphism density remains strictly positive, t (Tₖ, W) ^k-1, for all iterations of structural perturbation. It provides the computational weight supporting the existence of tree embeddings.
Forrest Forrest M. Anderson (Sun,) studied this question.