Related papers: Efficient Hamiltonian, structure and trace distance learning of Gaussian states

Efficient Hamiltonian, structure and trace distance learning of Gaussian states

URL: http://arxiv.org/abs/2411.03163v2
Date: Tue, 12 Nov 2024 14:18:51 GMT
Title: Efficient Hamiltonian, structure and trace distance learning of Gaussian states
Authors: Marco Fanizza, Cambyse Rouzé, Daniel Stilck França,
Abstract summary: We show that it is possible to learn the underlying interaction graph in a similar setting and sample complexity. Our results put the status of the quantum Hamiltonian learning problem for continuous variable systems in a much more advanced state.
Score: 2.949446809950691
License:
Abstract: In this work, we initiate the study of Hamiltonian learning for positive temperature bosonic Gaussian states, the quantum generalization of the widely studied problem of learning Gaussian graphical models. We obtain efficient protocols, both in sample and computational complexity, for the task of inferring the parameters of their underlying quadratic Hamiltonian under the assumption of bounded temperature, squeezing, displacement and maximal degree of the interaction graph. Our protocol only requires heterodyne measurements, which are often experimentally feasible, and has a sample complexity that scales logarithmically with the number of modes. Furthermore, we show that it is possible to learn the underlying interaction graph in a similar setting and sample complexity. Taken together, our results put the status of the quantum Hamiltonian learning problem for continuous variable systems in a much more advanced state when compared to spins, where state-of-the-art results are either unavailable or quantitatively inferior to ours. In addition, we use our techniques to obtain the first results on learning Gaussian states in trace distance with a quadratic scaling in precision and polynomial in the number of modes, albeit imposing certain restrictions on the Gaussian states. Our main technical innovations are several continuity bounds for the covariance and Hamiltonian matrix of a Gaussian state, which are of independent interest, combined with what we call the local inversion technique. In essence, the local inversion technique allows us to reliably infer the Hamiltonian of a Gaussian state by only estimating in parallel submatrices of the covariance matrix whose size scales with the desired precision, but not the number of modes. This way we bypass the need to obtain precise global estimates of the covariance matrix, controlling the sample complexity.

Related papers

Learning topological states from randomized measurements using variational tensor network tomography [0.4818215922729967]
Learning faithful representations of quantum states is crucial to fully characterizing the variety of many-body states created on quantum processors. We implement and study a tomographic method that combines variational optimization on tensor networks with randomized measurement techniques. We demonstrate its ability to learn the ground state of the surface code Hamiltonian as well as an experimentally realizable quantum spin liquid state.
arXiv Detail & Related papers (2024-05-31T21:05:43Z)
Gaussian Entanglement Measure: Applications to Multipartite Entanglement of Graph States and Bosonic Field Theory [50.24983453990065]
An entanglement measure based on the Fubini-Study metric has been recently introduced by Cocchiarella and co-workers. We present the Gaussian Entanglement Measure (GEM), a generalization of geometric entanglement measure for multimode Gaussian states. By providing a computable multipartite entanglement measure for systems with a large number of degrees of freedom, we show that our definition can be used to obtain insights into a free bosonic field theory.
arXiv Detail & Related papers (2024-01-31T15:50:50Z)
Efficient Learning of Long-Range and Equivariant Quantum Systems [9.427635404752936]
We consider a fundamental task in quantum many-body physics - finding and learning ground states of quantum Hamiltonians and their properties. Recent works have studied the task of predicting the ground state expectation value of sums of geometrically local observables by learning from data. We extend these results beyond the local requirements on both Hamiltonians and observables, motivated by the relevance of long-range interactions in molecular and atomic systems.
arXiv Detail & Related papers (2023-12-28T13:42:59Z)
Importance sampling for stochastic quantum simulations [68.8204255655161]
We introduce the qDrift protocol, which builds random product formulas by sampling from the Hamiltonian according to the coefficients. We show that the simulation cost can be reduced while achieving the same accuracy, by considering the individual simulation cost during the sampling stage. Results are confirmed by numerical simulations performed on a lattice nuclear effective field theory.
arXiv Detail & Related papers (2022-12-12T15:06:32Z)
Quantum impurity models using superpositions of fermionic Gaussian states: Practical methods and applications [0.0]
We present a practical approach for performing a variational calculation based on non-orthogonal fermionic Gaussian states. Our method is based on approximate imaginary-time equations of motion that decouple the dynamics of each state forming the ansatz. We also study the screening cloud of the two-channel Kondo model, a problem difficult to tackle using existing numerical tools.
arXiv Detail & Related papers (2021-05-03T18:00:08Z)
Local optimization on pure Gaussian state manifolds [63.76263875368856]
We exploit insights into the geometry of bosonic and fermionic Gaussian states to develop an efficient local optimization algorithm. The method is based on notions of descent gradient attuned to the local geometry. We use the presented methods to collect numerical and analytical evidence for the conjecture that Gaussian purifications are sufficient to compute the entanglement of purification of arbitrary mixed Gaussian states.
arXiv Detail & Related papers (2020-09-24T18:00:36Z)
Efficient construction of tensor-network representations of many-body Gaussian states [59.94347858883343]
We present a procedure to construct tensor-network representations of many-body Gaussian states efficiently and with a controllable error. These states include the ground and thermal states of bosonic and fermionic quadratic Hamiltonians, which are essential in the study of quantum many-body systems.
arXiv Detail & Related papers (2020-08-12T11:30:23Z)
Certified variational quantum algorithms for eigenstate preparation [0.0]
We develop a means to certify the termination of variational algorithms. We demonstrate our approach by applying it to three models: the transverse field Ising model, the model of one-dimensional spinless fermions with competing interactions, and the Schwinger model of quantum electrodynamics.
arXiv Detail & Related papers (2020-06-23T18:00:00Z)
Simulating nonnative cubic interactions on noisy quantum machines [65.38483184536494]
We show that quantum processors can be programmed to efficiently simulate dynamics that are not native to the hardware. On noisy devices without error correction, we show that simulation results are significantly improved when the quantum program is compiled using modular gates.
arXiv Detail & Related papers (2020-04-15T05:16:24Z)
Gaussian Process States: A data-driven representation of quantum many-body physics [59.7232780552418]
We present a novel, non-parametric form for compactly representing entangled many-body quantum states. The state is found to be highly compact, systematically improvable and efficient to sample. It is also proven to be a universal approximator' for quantum states, able to capture any entangled many-body state with increasing data set size.
arXiv Detail & Related papers (2020-02-27T15:54:44Z)

This list is automatically generated from the titles and abstracts of the papers in this site.