Any local Hamiltonian with ferromagnetic quantum many-body scars has a generalized Shiraishi-Mori form

TL;DR

This paper proves that local Hamiltonians with ferromagnetic quantum many-body scars necessarily have a generalized Shiraishi-Mori form, explaining the structural origin of these special eigenstates.

Contribution

It establishes a structural theorem showing that such Hamiltonians must decompose into a Zeeman term and local projectors that annihilate scar states, generalizing the Shiraishi-Mori construction.

Findings

Any local Hamiltonian with ferromagnetic QMBS admits a specific decomposition.

The generalized Shiraishi-Mori form is essentially exhaustive for these scar states.

Projector-based interactions and equally spaced scar towers are structurally explained.

Abstract

Quantum many-body scars (QMBS) are nonthermal eigenstates embedded in otherwise thermal spectra. A broad class of exact QMBS is realized as fixed-momentum magnon states above a ferromagnetic reference state. Here we prove a structural theorem for this class. Specifically, we show that any local Hamiltonian hosting such ``ferromagnetic scar states'' necessarily admits a decomposition into a Zeeman term and terms containing local projectors that annihilate the scar states locally. This result establishes that an appropriate generalization of the Shiraishi--Mori construction is essentially exhaustive for ferromagnetic QMBS and provides a unified structural explanation for the recurrent appearance of projector-based interactions and equally spaced scar towers across a broad family of exact scar Hamiltonians.