Generalization of the Affleck-Kennedy-Lieb-Tasaki Model for Quantum Ferromagnetism

Abstract

We study a spin-S ferromagnetic model with exactly-written ground states, known as the partially-magnetized valence bond solid (VBS) states with magnetization m=(S-1)/S, which is a ferromagnetic generalization of the Affleck-Kennedy-Lieb-Tasaki model. We find that the VBS state and an antiferromagnetic ground state with magnetization m=0 are degenerate for S=3/2 and S=2 by using the Lanczos method and the density matrix renormalization group method (DMRG). However, increasing S, the magnetization of the ground states is uniquely determined as the fraction m=(S-1)/S. This is not just a ferromagnet, but a quantum ferromagnet due to quantum entanglement inherent in VBS states. In the low-energy excitation spectrum, we find the coexistence of the Haldane gap and Goldstone-like ferromagnetic magnon excitation. This ``magnetic chimera'' clearly appears under a finite magnetic field. Finally, we discuss an application to the measurement-based quantum computation and an extension of the Haldane's conjecture.