Learning Quantum Hamiltonians at Any Temperature in Polynomial Time

被引：0

作者：

Bakshi, Ainesh ^{[1
]}

Liu, Allen ^{[1
]}

Moitra, Ankur ^{[1
]}

Tang, Ewin ^{[2
]}

机构：

[1] MIT, Cambridge, MA 02139 USA

[2] Univ Calif Berkeley, Berkeley, CA 94720 USA

来源：

PROCEEDINGS OF THE 56TH ANNUAL ACM SYMPOSIUM ON THEORY OF COMPUTING, STOC 2024 | 2024年

关键词：

Hamiltonian learning; Gibbs state; critical temperature; effcient algorithm; polynomial approximation; sum-of-squares; constraint system; SUM;

D O I：

10.1145/3618260.3649619

中图分类号：

TP301 [理论、方法];

学科分类号：

081202 ;

摘要：

We study the problem of learning a local quantum Hamiltonian H given copies of its Gibbs state rho = e(-beta H)/tr(e(-beta H)) at a known inverse temperature beta > 0. Anshu, Arunachalam, Kuwahara, and Soleimanifar gave an algorithm to learn a Hamiltonian on n qubits to precision epsilon with only polynomially many copies of the Gibbs state, but which takes exponential time. Obtaining a computationally efficient algorithm has been a major open problem, with prior work only resolving this in the limited cases of high temperature or commuting terms. We fully resolve this problem, giving a polynomial time algorithm for learning H to precision from polynomially many copies of the Gibbs state at any constant beta > 0. Our main technical contribution is a new flat polynomial approximation to the exponential function, and a translation between multi-variate scalar polynomials and nested commutators. This enables us to formulate Hamiltonian learning as a polynomial system. We then show that solving a low-degree sum-of-squares relaxation of this polynomial system suffices to accurately learn the Hamiltonian.

引用

页码：1470 / 1477

页数：8

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