Proof of nonintegrability of the spin-$1$ bilinear-biquadratic chain model

Spin-$1$ chain models have been extensively studied in condensed matter physics, significantly advancing our understanding of quantum magnetism and low-dimensional systems, which exhibit unique properties compared to their spin-$1/2$ counterparts. Despite substantial progress in this area, providing a rigorous proof of nonintegrability for the bilinear-biquadratic chain model has remained an open challenge. While integrable solutions are known for specific parameter values, a comprehensive understanding of the model's general integrability has been elusive. In this paper, we present the first rigorous proof of nonintegrability for the general spin-$1$ bilinear-biquadratic chain models. Our proof not only confirms the nonintegrability of widely studied models but also extends to offer deeper insights into several areas. These include the unification of nonintegrability proofs using graph theoretical methods and the identification of the absence of local conserved quantities in quantum many-body scar systems with perfect revivals, such as the AKLT model. This work marks a significant step toward understanding the complex dynamics of spin-$1$ systems and offers a framework that can be applied to a broader class of quantum many-body systems.