Litcius/Paper detail

Riemannian geometry and automatic differentiation for optimization problems of quantum physics and quantum technologies

Ilia A Luchnikov, Mikhail E Krechetov, Sergey N Filippov

2021New Journal of Physics44 citationsDOIOpen Access PDF

Abstract

Abstract Optimization with constraints is a typical problem in quantum physics and quantum information science that becomes especially challenging for high-dimensional systems and complex architectures like tensor networks. Here we use ideas of Riemannian geometry to perform optimization on the manifolds of unitary and isometric matrices as well as the cone of positive-definite matrices. Combining this approach with the up-to-date computational methods of automatic differentiation, we demonstrate the efficacy of the Riemannian optimization in the study of the low-energy spectrum and eigenstates of multipartite Hamiltonians, variational search of a tensor network in the form of the multiscale entanglement-renormalization ansatz, preparation of arbitrary states (including highly entangled ones) in the circuit implementation of quantum computation, decomposition of quantum gates, and tomography of quantum states. Universality of the developed approach together with the provided open source software enable one to apply the Riemannian optimization to complex quantum architectures well beyond the listed problems, for instance, to the optimal control of noisy quantum systems.

Topics & Concepts

PhysicsQuantum geometryOpen quantum systemQuantum informationQuantumQuantum algorithmQuantum technologyQuantum networkEigenvalues and eigenvectorsUnitary stateQuantum information scienceTensor (intrinsic definition)Quantum error correctionQuantum processQuantum mechanicsTheoretical physicsUniversality (dynamical systems)Quantum operationQuantum stateQuantum computerOptimization problemRiemannian geometryPOVMClassical mechanicsTopology (electrical circuits)Quantum simulatorUnitarityQuantum circuitQuantum entanglementQuantum systemStatistical physicsQuantum gravityAlgebra over a fieldQuantum dynamicsPure mathematicsQuantum sensorQuantum many-body systemsQuantum Computing Algorithms and ArchitectureTensor decomposition and applications