Related papers: Efficient Eigenstate Preparation in an Integrable Model with Hilbert Space Fragmentation

Efficient Eigenstate Preparation in an Integrable Model with Hilbert Space Fragmentation

URL: http://arxiv.org/abs/2411.15132v2
Date: Tue, 03 Dec 2024 18:06:20 GMT
Title: Efficient Eigenstate Preparation in an Integrable Model with Hilbert Space Fragmentation
Authors: Roberto Ruiz, Alejandro Sopena, Balázs Pozsgay, Esperanza López,
Abstract summary: We consider the preparation of all the eigenstates of spin chains using quantum circuits. We showivities of the growth is also achievable for interacting models where the interaction between the particles is sufficiently simple.
Score: 42.408991654684876
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Abstract: We consider the preparation of all the eigenstates of spin chains using quantum circuits. It is known that generic eigenstates of free-fermionic spin chains can be prepared with circuits whose depth grows only polynomially with the length of the chain and the number of particles. We show that the polynomial growth is also achievable for selected interacting models where the interaction between the particles is sufficiently simple. Our working example is the folded XXZ model, an integrable spin chain that exhibits Hilbert space fragmentation. We present the explicit quantum circuits that prepare arbitrary eigenstates of this model on an open chain efficiently. We perform error-mitigated noisy simulations with circuits of up to 13 qubits and different connectivities between qubits, achieving a relative error below 5%. As a byproduct, we extend a recent reformulation of the Bethe ansatz as a quantum circuit from closed to open boundary conditions.

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